type state_t is (IDLE,
DO_MCRFS, DO_MTFSB, DO_MTFSFI, DO_MFFS, DO_MTFSF,
- DO_FMR);
+ DO_FMR, DO_FMRG, DO_FCMP, DO_FTDIV, DO_FTSQRT,
+ DO_FCFID, DO_FCTI,
+ DO_FRSP, DO_FRI,
+ DO_FADD, DO_FMUL, DO_FDIV, DO_FSQRT, DO_FMADD,
+ DO_FRE, DO_FRSQRTE,
+ DO_FSEL,
+ FRI_1,
+ ADD_1, ADD_SHIFT, ADD_2, ADD_3,
+ CMP_1, CMP_2,
+ MULT_1,
+ FMADD_1, FMADD_2, FMADD_3,
+ FMADD_4, FMADD_5, FMADD_6,
+ LOOKUP,
+ DIV_2, DIV_3, DIV_4, DIV_5, DIV_6,
+ FRE_1,
+ RSQRT_1,
+ FTDIV_1,
+ SQRT_1, SQRT_2, SQRT_3, SQRT_4,
+ SQRT_5, SQRT_6, SQRT_7, SQRT_8,
+ SQRT_9, SQRT_10, SQRT_11, SQRT_12,
+ INT_SHIFT, INT_ROUND, INT_ISHIFT,
+ INT_FINAL, INT_CHECK, INT_OFLOW,
+ FINISH, NORMALIZE,
+ ROUND_UFLOW, ROUND_OFLOW,
+ ROUNDING, ROUNDING_2, ROUNDING_3,
+ DENORM,
+ RENORM_A, RENORM_A2,
+ RENORM_B, RENORM_B2,
+ RENORM_C, RENORM_C2,
+ NAN_RESULT, EXC_RESULT);
type reg_type is record
state : state_t;
busy : std_ulogic;
instr_done : std_ulogic;
do_intr : std_ulogic;
+ illegal : std_ulogic;
op : insn_type_t;
insn : std_ulogic_vector(31 downto 0);
+ nia : std_ulogic_vector(63 downto 0);
+ instr_tag : instr_tag_t;
dest_fpr : gspr_index_t;
fe_mode : std_ulogic;
rc : std_ulogic;
fpscr : std_ulogic_vector(31 downto 0);
a : fpu_reg_type;
b : fpu_reg_type;
- r : std_ulogic_vector(63 downto 0);
+ c : fpu_reg_type;
+ r : std_ulogic_vector(63 downto 0); -- 10.54 format
+ s : std_ulogic_vector(55 downto 0); -- extended fraction
+ x : std_ulogic;
+ p : std_ulogic_vector(63 downto 0); -- 8.56 format
+ y : std_ulogic_vector(63 downto 0); -- 8.56 format
result_sign : std_ulogic;
result_class : fp_number_class;
result_exp : signed(EXP_BITS-1 downto 0);
+ shift : signed(EXP_BITS-1 downto 0);
writing_back : std_ulogic;
int_result : std_ulogic;
cr_result : std_ulogic_vector(3 downto 0);
cr_mask : std_ulogic_vector(7 downto 0);
+ old_exc : std_ulogic_vector(4 downto 0);
+ update_fprf : std_ulogic;
+ quieten_nan : std_ulogic;
+ tiny : std_ulogic;
+ denorm : std_ulogic;
+ round_mode : std_ulogic_vector(2 downto 0);
+ is_subtract : std_ulogic;
+ exp_cmp : std_ulogic;
+ madd_cmp : std_ulogic;
+ add_bsmall : std_ulogic;
+ is_multiply : std_ulogic;
+ is_sqrt : std_ulogic;
+ first : std_ulogic;
+ count : unsigned(1 downto 0);
+ doing_ftdiv : std_ulogic_vector(1 downto 0);
+ opsel_a : std_ulogic_vector(1 downto 0);
+ use_a : std_ulogic;
+ use_b : std_ulogic;
+ use_c : std_ulogic;
+ invalid : std_ulogic;
+ negate : std_ulogic;
+ longmask : std_ulogic;
end record;
+ type lookup_table is array(0 to 1023) of std_ulogic_vector(17 downto 0);
+
signal r, rin : reg_type;
signal fp_result : std_ulogic_vector(63 downto 0);
+ signal opsel_b : std_ulogic_vector(1 downto 0);
signal opsel_r : std_ulogic_vector(1 downto 0);
+ signal opsel_s : std_ulogic_vector(1 downto 0);
+ signal opsel_ainv : std_ulogic;
+ signal opsel_mask : std_ulogic;
+ signal opsel_binv : std_ulogic;
+ signal in_a : std_ulogic_vector(63 downto 0);
+ signal in_b : std_ulogic_vector(63 downto 0);
signal result : std_ulogic_vector(63 downto 0);
+ signal carry_in : std_ulogic;
+ signal lost_bits : std_ulogic;
+ signal r_hi_nz : std_ulogic;
+ signal r_lo_nz : std_ulogic;
+ signal s_nz : std_ulogic;
+ signal misc_sel : std_ulogic_vector(3 downto 0);
+ signal f_to_multiply : MultiplyInputType;
+ signal multiply_to_f : MultiplyOutputType;
+ signal msel_1 : std_ulogic_vector(1 downto 0);
+ signal msel_2 : std_ulogic_vector(1 downto 0);
+ signal msel_add : std_ulogic_vector(1 downto 0);
+ signal msel_inv : std_ulogic;
+ signal inverse_est : std_ulogic_vector(18 downto 0);
+
+ -- opsel values
+ constant AIN_R : std_ulogic_vector(1 downto 0) := "00";
+ constant AIN_A : std_ulogic_vector(1 downto 0) := "01";
+ constant AIN_B : std_ulogic_vector(1 downto 0) := "10";
+ constant AIN_C : std_ulogic_vector(1 downto 0) := "11";
+
+ constant BIN_ZERO : std_ulogic_vector(1 downto 0) := "00";
+ constant BIN_R : std_ulogic_vector(1 downto 0) := "01";
+ constant BIN_RND : std_ulogic_vector(1 downto 0) := "10";
+ constant BIN_PS6 : std_ulogic_vector(1 downto 0) := "11";
+
+ constant RES_SUM : std_ulogic_vector(1 downto 0) := "00";
+ constant RES_SHIFT : std_ulogic_vector(1 downto 0) := "01";
+ constant RES_MULT : std_ulogic_vector(1 downto 0) := "10";
+ constant RES_MISC : std_ulogic_vector(1 downto 0) := "11";
+
+ constant S_ZERO : std_ulogic_vector(1 downto 0) := "00";
+ constant S_NEG : std_ulogic_vector(1 downto 0) := "01";
+ constant S_SHIFT : std_ulogic_vector(1 downto 0) := "10";
+ constant S_MULT : std_ulogic_vector(1 downto 0) := "11";
+
+ -- msel values
+ constant MUL1_A : std_ulogic_vector(1 downto 0) := "00";
+ constant MUL1_B : std_ulogic_vector(1 downto 0) := "01";
+ constant MUL1_Y : std_ulogic_vector(1 downto 0) := "10";
+ constant MUL1_R : std_ulogic_vector(1 downto 0) := "11";
+
+ constant MUL2_C : std_ulogic_vector(1 downto 0) := "00";
+ constant MUL2_LUT : std_ulogic_vector(1 downto 0) := "01";
+ constant MUL2_P : std_ulogic_vector(1 downto 0) := "10";
+ constant MUL2_R : std_ulogic_vector(1 downto 0) := "11";
+
+ constant MULADD_ZERO : std_ulogic_vector(1 downto 0) := "00";
+ constant MULADD_CONST : std_ulogic_vector(1 downto 0) := "01";
+ constant MULADD_A : std_ulogic_vector(1 downto 0) := "10";
+ constant MULADD_RS : std_ulogic_vector(1 downto 0) := "11";
+
+ -- Inverse lookup table, indexed by the top 8 fraction bits
+ -- The first 256 entries are the reciprocal (1/x) lookup table,
+ -- and the remaining 768 entries are the reciprocal square root table.
+ -- Output range is [0.5, 1) in 0.19 format, though the top
+ -- bit isn't stored since it is always 1.
+ -- Each output value is the inverse of the center of the input
+ -- range for the value, i.e. entry 0 is 1 / (1 + 1/512),
+ -- entry 1 is 1 / (1 + 3/512), etc.
+ signal inverse_table : lookup_table := (
+ -- 1/x lookup table
+ -- Unit bit is assumed to be 1, so input range is [1, 2)
+ 18x"3fc01", 18x"3f411", 18x"3ec31", 18x"3e460", 18x"3dc9f", 18x"3d4ec", 18x"3cd49", 18x"3c5b5",
+ 18x"3be2f", 18x"3b6b8", 18x"3af4f", 18x"3a7f4", 18x"3a0a7", 18x"39968", 18x"39237", 18x"38b14",
+ 18x"383fe", 18x"37cf5", 18x"375f9", 18x"36f0a", 18x"36828", 18x"36153", 18x"35a8a", 18x"353ce",
+ 18x"34d1e", 18x"3467a", 18x"33fe3", 18x"33957", 18x"332d7", 18x"32c62", 18x"325f9", 18x"31f9c",
+ 18x"3194a", 18x"31303", 18x"30cc7", 18x"30696", 18x"30070", 18x"2fa54", 18x"2f443", 18x"2ee3d",
+ 18x"2e841", 18x"2e250", 18x"2dc68", 18x"2d68b", 18x"2d0b8", 18x"2caee", 18x"2c52e", 18x"2bf79",
+ 18x"2b9cc", 18x"2b429", 18x"2ae90", 18x"2a900", 18x"2a379", 18x"29dfb", 18x"29887", 18x"2931b",
+ 18x"28db8", 18x"2885e", 18x"2830d", 18x"27dc4", 18x"27884", 18x"2734d", 18x"26e1d", 18x"268f6",
+ 18x"263d8", 18x"25ec1", 18x"259b3", 18x"254ac", 18x"24fad", 18x"24ab7", 18x"245c8", 18x"240e1",
+ 18x"23c01", 18x"23729", 18x"23259", 18x"22d90", 18x"228ce", 18x"22413", 18x"21f60", 18x"21ab4",
+ 18x"2160f", 18x"21172", 18x"20cdb", 18x"2084b", 18x"203c2", 18x"1ff40", 18x"1fac4", 18x"1f64f",
+ 18x"1f1e1", 18x"1ed79", 18x"1e918", 18x"1e4be", 18x"1e069", 18x"1dc1b", 18x"1d7d4", 18x"1d392",
+ 18x"1cf57", 18x"1cb22", 18x"1c6f3", 18x"1c2ca", 18x"1bea7", 18x"1ba8a", 18x"1b672", 18x"1b261",
+ 18x"1ae55", 18x"1aa50", 18x"1a64f", 18x"1a255", 18x"19e60", 18x"19a70", 18x"19686", 18x"192a2",
+ 18x"18ec3", 18x"18ae9", 18x"18715", 18x"18345", 18x"17f7c", 18x"17bb7", 18x"177f7", 18x"1743d",
+ 18x"17087", 18x"16cd7", 18x"1692c", 18x"16585", 18x"161e4", 18x"15e47", 18x"15ab0", 18x"1571d",
+ 18x"1538e", 18x"15005", 18x"14c80", 18x"14900", 18x"14584", 18x"1420d", 18x"13e9b", 18x"13b2d",
+ 18x"137c3", 18x"1345e", 18x"130fe", 18x"12da2", 18x"12a4a", 18x"126f6", 18x"123a7", 18x"1205c",
+ 18x"11d15", 18x"119d2", 18x"11694", 18x"11359", 18x"11023", 18x"10cf1", 18x"109c2", 18x"10698",
+ 18x"10372", 18x"10050", 18x"0fd31", 18x"0fa17", 18x"0f700", 18x"0f3ed", 18x"0f0de", 18x"0edd3",
+ 18x"0eacb", 18x"0e7c7", 18x"0e4c7", 18x"0e1ca", 18x"0ded2", 18x"0dbdc", 18x"0d8eb", 18x"0d5fc",
+ 18x"0d312", 18x"0d02b", 18x"0cd47", 18x"0ca67", 18x"0c78a", 18x"0c4b1", 18x"0c1db", 18x"0bf09",
+ 18x"0bc3a", 18x"0b96e", 18x"0b6a5", 18x"0b3e0", 18x"0b11e", 18x"0ae5f", 18x"0aba3", 18x"0a8eb",
+ 18x"0a636", 18x"0a383", 18x"0a0d4", 18x"09e28", 18x"09b80", 18x"098da", 18x"09637", 18x"09397",
+ 18x"090fb", 18x"08e61", 18x"08bca", 18x"08936", 18x"086a5", 18x"08417", 18x"0818c", 18x"07f04",
+ 18x"07c7e", 18x"079fc", 18x"0777c", 18x"074ff", 18x"07284", 18x"0700d", 18x"06d98", 18x"06b26",
+ 18x"068b6", 18x"0664a", 18x"063e0", 18x"06178", 18x"05f13", 18x"05cb1", 18x"05a52", 18x"057f5",
+ 18x"0559a", 18x"05342", 18x"050ed", 18x"04e9a", 18x"04c4a", 18x"049fc", 18x"047b0", 18x"04567",
+ 18x"04321", 18x"040dd", 18x"03e9b", 18x"03c5c", 18x"03a1f", 18x"037e4", 18x"035ac", 18x"03376",
+ 18x"03142", 18x"02f11", 18x"02ce2", 18x"02ab5", 18x"0288b", 18x"02663", 18x"0243d", 18x"02219",
+ 18x"01ff7", 18x"01dd8", 18x"01bbb", 18x"019a0", 18x"01787", 18x"01570", 18x"0135b", 18x"01149",
+ 18x"00f39", 18x"00d2a", 18x"00b1e", 18x"00914", 18x"0070c", 18x"00506", 18x"00302", 18x"00100",
+ -- 1/sqrt(x) lookup table
+ -- Input is in the range [1, 4), i.e. two bits to the left of the
+ -- binary point. Those 2 bits index the following 3 blocks of 256 values.
+ -- 1.0 ... 1.9999
+ 18x"3fe00", 18x"3fa06", 18x"3f612", 18x"3f224", 18x"3ee3a", 18x"3ea58", 18x"3e67c", 18x"3e2a4",
+ 18x"3ded2", 18x"3db06", 18x"3d73e", 18x"3d37e", 18x"3cfc2", 18x"3cc0a", 18x"3c85a", 18x"3c4ae",
+ 18x"3c106", 18x"3bd64", 18x"3b9c8", 18x"3b630", 18x"3b29e", 18x"3af10", 18x"3ab86", 18x"3a802",
+ 18x"3a484", 18x"3a108", 18x"39d94", 18x"39a22", 18x"396b6", 18x"3934e", 18x"38fea", 18x"38c8c",
+ 18x"38932", 18x"385dc", 18x"3828a", 18x"37f3e", 18x"37bf6", 18x"378b2", 18x"37572", 18x"37236",
+ 18x"36efe", 18x"36bca", 18x"3689a", 18x"36570", 18x"36248", 18x"35f26", 18x"35c06", 18x"358ea",
+ 18x"355d4", 18x"352c0", 18x"34fb0", 18x"34ca4", 18x"3499c", 18x"34698", 18x"34398", 18x"3409c",
+ 18x"33da2", 18x"33aac", 18x"337bc", 18x"334cc", 18x"331e2", 18x"32efc", 18x"32c18", 18x"32938",
+ 18x"3265a", 18x"32382", 18x"320ac", 18x"31dd8", 18x"31b0a", 18x"3183e", 18x"31576", 18x"312b0",
+ 18x"30fee", 18x"30d2e", 18x"30a74", 18x"307ba", 18x"30506", 18x"30254", 18x"2ffa4", 18x"2fcf8",
+ 18x"2fa4e", 18x"2f7a8", 18x"2f506", 18x"2f266", 18x"2efca", 18x"2ed2e", 18x"2ea98", 18x"2e804",
+ 18x"2e572", 18x"2e2e4", 18x"2e058", 18x"2ddce", 18x"2db48", 18x"2d8c6", 18x"2d646", 18x"2d3c8",
+ 18x"2d14c", 18x"2ced4", 18x"2cc5e", 18x"2c9ea", 18x"2c77a", 18x"2c50c", 18x"2c2a2", 18x"2c038",
+ 18x"2bdd2", 18x"2bb70", 18x"2b90e", 18x"2b6b0", 18x"2b454", 18x"2b1fa", 18x"2afa4", 18x"2ad4e",
+ 18x"2aafc", 18x"2a8ac", 18x"2a660", 18x"2a414", 18x"2a1cc", 18x"29f86", 18x"29d42", 18x"29b00",
+ 18x"298c2", 18x"29684", 18x"2944a", 18x"29210", 18x"28fda", 18x"28da6", 18x"28b74", 18x"28946",
+ 18x"28718", 18x"284ec", 18x"282c4", 18x"2809c", 18x"27e78", 18x"27c56", 18x"27a34", 18x"27816",
+ 18x"275fa", 18x"273e0", 18x"271c8", 18x"26fb0", 18x"26d9c", 18x"26b8a", 18x"2697a", 18x"2676c",
+ 18x"26560", 18x"26356", 18x"2614c", 18x"25f46", 18x"25d42", 18x"25b40", 18x"2593e", 18x"25740",
+ 18x"25542", 18x"25348", 18x"2514e", 18x"24f58", 18x"24d62", 18x"24b6e", 18x"2497c", 18x"2478c",
+ 18x"2459e", 18x"243b0", 18x"241c6", 18x"23fde", 18x"23df6", 18x"23c10", 18x"23a2c", 18x"2384a",
+ 18x"2366a", 18x"2348c", 18x"232ae", 18x"230d2", 18x"22efa", 18x"22d20", 18x"22b4a", 18x"22976",
+ 18x"227a2", 18x"225d2", 18x"22402", 18x"22234", 18x"22066", 18x"21e9c", 18x"21cd2", 18x"21b0a",
+ 18x"21944", 18x"2177e", 18x"215ba", 18x"213fa", 18x"21238", 18x"2107a", 18x"20ebc", 18x"20d00",
+ 18x"20b46", 18x"2098e", 18x"207d6", 18x"20620", 18x"2046c", 18x"202b8", 18x"20108", 18x"1ff58",
+ 18x"1fda8", 18x"1fbfc", 18x"1fa50", 18x"1f8a4", 18x"1f6fc", 18x"1f554", 18x"1f3ae", 18x"1f208",
+ 18x"1f064", 18x"1eec2", 18x"1ed22", 18x"1eb82", 18x"1e9e4", 18x"1e846", 18x"1e6aa", 18x"1e510",
+ 18x"1e378", 18x"1e1e0", 18x"1e04a", 18x"1deb4", 18x"1dd20", 18x"1db8e", 18x"1d9fc", 18x"1d86c",
+ 18x"1d6de", 18x"1d550", 18x"1d3c4", 18x"1d238", 18x"1d0ae", 18x"1cf26", 18x"1cd9e", 18x"1cc18",
+ 18x"1ca94", 18x"1c910", 18x"1c78c", 18x"1c60a", 18x"1c48a", 18x"1c30c", 18x"1c18e", 18x"1c010",
+ 18x"1be94", 18x"1bd1a", 18x"1bba0", 18x"1ba28", 18x"1b8b2", 18x"1b73c", 18x"1b5c6", 18x"1b452",
+ 18x"1b2e0", 18x"1b16e", 18x"1affe", 18x"1ae8e", 18x"1ad20", 18x"1abb4", 18x"1aa46", 18x"1a8dc",
+ -- 2.0 ... 2.9999
+ 18x"1a772", 18x"1a608", 18x"1a4a0", 18x"1a33a", 18x"1a1d4", 18x"1a070", 18x"19f0c", 18x"19da8",
+ 18x"19c48", 18x"19ae6", 18x"19986", 18x"19828", 18x"196ca", 18x"1956e", 18x"19412", 18x"192b8",
+ 18x"1915e", 18x"19004", 18x"18eae", 18x"18d56", 18x"18c00", 18x"18aac", 18x"18958", 18x"18804",
+ 18x"186b2", 18x"18562", 18x"18412", 18x"182c2", 18x"18174", 18x"18026", 18x"17eda", 18x"17d8e",
+ 18x"17c44", 18x"17afa", 18x"179b2", 18x"1786a", 18x"17724", 18x"175de", 18x"17498", 18x"17354",
+ 18x"17210", 18x"170ce", 18x"16f8c", 18x"16e4c", 18x"16d0c", 18x"16bcc", 18x"16a8e", 18x"16950",
+ 18x"16814", 18x"166d8", 18x"1659e", 18x"16464", 18x"1632a", 18x"161f2", 18x"160ba", 18x"15f84",
+ 18x"15e4e", 18x"15d1a", 18x"15be6", 18x"15ab2", 18x"15980", 18x"1584e", 18x"1571c", 18x"155ec",
+ 18x"154bc", 18x"1538e", 18x"15260", 18x"15134", 18x"15006", 18x"14edc", 18x"14db0", 18x"14c86",
+ 18x"14b5e", 18x"14a36", 18x"1490e", 18x"147e6", 18x"146c0", 18x"1459a", 18x"14476", 18x"14352",
+ 18x"14230", 18x"1410c", 18x"13fea", 18x"13eca", 18x"13daa", 18x"13c8a", 18x"13b6c", 18x"13a4e",
+ 18x"13930", 18x"13814", 18x"136f8", 18x"135dc", 18x"134c2", 18x"133a8", 18x"1328e", 18x"13176",
+ 18x"1305e", 18x"12f48", 18x"12e30", 18x"12d1a", 18x"12c06", 18x"12af2", 18x"129de", 18x"128ca",
+ 18x"127b8", 18x"126a6", 18x"12596", 18x"12486", 18x"12376", 18x"12266", 18x"12158", 18x"1204a",
+ 18x"11f3e", 18x"11e32", 18x"11d26", 18x"11c1a", 18x"11b10", 18x"11a06", 18x"118fc", 18x"117f4",
+ 18x"116ec", 18x"115e4", 18x"114de", 18x"113d8", 18x"112d2", 18x"111ce", 18x"110ca", 18x"10fc6",
+ 18x"10ec2", 18x"10dc0", 18x"10cbe", 18x"10bbc", 18x"10abc", 18x"109bc", 18x"108bc", 18x"107be",
+ 18x"106c0", 18x"105c2", 18x"104c4", 18x"103c8", 18x"102cc", 18x"101d0", 18x"100d6", 18x"0ffdc",
+ 18x"0fee2", 18x"0fdea", 18x"0fcf0", 18x"0fbf8", 18x"0fb02", 18x"0fa0a", 18x"0f914", 18x"0f81e",
+ 18x"0f72a", 18x"0f636", 18x"0f542", 18x"0f44e", 18x"0f35a", 18x"0f268", 18x"0f176", 18x"0f086",
+ 18x"0ef94", 18x"0eea4", 18x"0edb4", 18x"0ecc6", 18x"0ebd6", 18x"0eae8", 18x"0e9fa", 18x"0e90e",
+ 18x"0e822", 18x"0e736", 18x"0e64a", 18x"0e55e", 18x"0e474", 18x"0e38a", 18x"0e2a0", 18x"0e1b8",
+ 18x"0e0d0", 18x"0dfe8", 18x"0df00", 18x"0de1a", 18x"0dd32", 18x"0dc4c", 18x"0db68", 18x"0da82",
+ 18x"0d99e", 18x"0d8ba", 18x"0d7d6", 18x"0d6f4", 18x"0d612", 18x"0d530", 18x"0d44e", 18x"0d36c",
+ 18x"0d28c", 18x"0d1ac", 18x"0d0cc", 18x"0cfee", 18x"0cf0e", 18x"0ce30", 18x"0cd54", 18x"0cc76",
+ 18x"0cb9a", 18x"0cabc", 18x"0c9e0", 18x"0c906", 18x"0c82a", 18x"0c750", 18x"0c676", 18x"0c59c",
+ 18x"0c4c4", 18x"0c3ea", 18x"0c312", 18x"0c23a", 18x"0c164", 18x"0c08c", 18x"0bfb6", 18x"0bee0",
+ 18x"0be0a", 18x"0bd36", 18x"0bc62", 18x"0bb8c", 18x"0baba", 18x"0b9e6", 18x"0b912", 18x"0b840",
+ 18x"0b76e", 18x"0b69c", 18x"0b5cc", 18x"0b4fa", 18x"0b42a", 18x"0b35a", 18x"0b28a", 18x"0b1bc",
+ 18x"0b0ee", 18x"0b01e", 18x"0af50", 18x"0ae84", 18x"0adb6", 18x"0acea", 18x"0ac1e", 18x"0ab52",
+ 18x"0aa86", 18x"0a9bc", 18x"0a8f0", 18x"0a826", 18x"0a75c", 18x"0a694", 18x"0a5ca", 18x"0a502",
+ 18x"0a43a", 18x"0a372", 18x"0a2aa", 18x"0a1e4", 18x"0a11c", 18x"0a056", 18x"09f90", 18x"09ecc",
+ -- 3.0 ... 3.9999
+ 18x"09e06", 18x"09d42", 18x"09c7e", 18x"09bba", 18x"09af6", 18x"09a32", 18x"09970", 18x"098ae",
+ 18x"097ec", 18x"0972a", 18x"09668", 18x"095a8", 18x"094e8", 18x"09426", 18x"09368", 18x"092a8",
+ 18x"091e8", 18x"0912a", 18x"0906c", 18x"08fae", 18x"08ef0", 18x"08e32", 18x"08d76", 18x"08cba",
+ 18x"08bfe", 18x"08b42", 18x"08a86", 18x"089ca", 18x"08910", 18x"08856", 18x"0879c", 18x"086e2",
+ 18x"08628", 18x"08570", 18x"084b6", 18x"083fe", 18x"08346", 18x"0828e", 18x"081d8", 18x"08120",
+ 18x"0806a", 18x"07fb4", 18x"07efe", 18x"07e48", 18x"07d92", 18x"07cde", 18x"07c2a", 18x"07b76",
+ 18x"07ac2", 18x"07a0e", 18x"0795a", 18x"078a8", 18x"077f4", 18x"07742", 18x"07690", 18x"075de",
+ 18x"0752e", 18x"0747c", 18x"073cc", 18x"0731c", 18x"0726c", 18x"071bc", 18x"0710c", 18x"0705e",
+ 18x"06fae", 18x"06f00", 18x"06e52", 18x"06da4", 18x"06cf6", 18x"06c4a", 18x"06b9c", 18x"06af0",
+ 18x"06a44", 18x"06998", 18x"068ec", 18x"06840", 18x"06796", 18x"066ea", 18x"06640", 18x"06596",
+ 18x"064ec", 18x"06442", 18x"0639a", 18x"062f0", 18x"06248", 18x"061a0", 18x"060f8", 18x"06050",
+ 18x"05fa8", 18x"05f00", 18x"05e5a", 18x"05db4", 18x"05d0e", 18x"05c68", 18x"05bc2", 18x"05b1c",
+ 18x"05a76", 18x"059d2", 18x"0592e", 18x"05888", 18x"057e4", 18x"05742", 18x"0569e", 18x"055fa",
+ 18x"05558", 18x"054b6", 18x"05412", 18x"05370", 18x"052ce", 18x"0522e", 18x"0518c", 18x"050ec",
+ 18x"0504a", 18x"04faa", 18x"04f0a", 18x"04e6a", 18x"04dca", 18x"04d2c", 18x"04c8c", 18x"04bee",
+ 18x"04b50", 18x"04ab0", 18x"04a12", 18x"04976", 18x"048d8", 18x"0483a", 18x"0479e", 18x"04700",
+ 18x"04664", 18x"045c8", 18x"0452c", 18x"04490", 18x"043f6", 18x"0435a", 18x"042c0", 18x"04226",
+ 18x"0418a", 18x"040f0", 18x"04056", 18x"03fbe", 18x"03f24", 18x"03e8c", 18x"03df2", 18x"03d5a",
+ 18x"03cc2", 18x"03c2a", 18x"03b92", 18x"03afa", 18x"03a62", 18x"039cc", 18x"03934", 18x"0389e",
+ 18x"03808", 18x"03772", 18x"036dc", 18x"03646", 18x"035b2", 18x"0351c", 18x"03488", 18x"033f2",
+ 18x"0335e", 18x"032ca", 18x"03236", 18x"031a2", 18x"03110", 18x"0307c", 18x"02fea", 18x"02f56",
+ 18x"02ec4", 18x"02e32", 18x"02da0", 18x"02d0e", 18x"02c7c", 18x"02bec", 18x"02b5a", 18x"02aca",
+ 18x"02a38", 18x"029a8", 18x"02918", 18x"02888", 18x"027f8", 18x"0276a", 18x"026da", 18x"0264a",
+ 18x"025bc", 18x"0252e", 18x"024a0", 18x"02410", 18x"02384", 18x"022f6", 18x"02268", 18x"021da",
+ 18x"0214e", 18x"020c0", 18x"02034", 18x"01fa8", 18x"01f1c", 18x"01e90", 18x"01e04", 18x"01d78",
+ 18x"01cee", 18x"01c62", 18x"01bd8", 18x"01b4c", 18x"01ac2", 18x"01a38", 18x"019ae", 18x"01924",
+ 18x"0189c", 18x"01812", 18x"01788", 18x"01700", 18x"01676", 18x"015ee", 18x"01566", 18x"014de",
+ 18x"01456", 18x"013ce", 18x"01346", 18x"012c0", 18x"01238", 18x"011b2", 18x"0112c", 18x"010a4",
+ 18x"0101e", 18x"00f98", 18x"00f12", 18x"00e8c", 18x"00e08", 18x"00d82", 18x"00cfe", 18x"00c78",
+ 18x"00bf4", 18x"00b70", 18x"00aec", 18x"00a68", 18x"009e4", 18x"00960", 18x"008dc", 18x"00858",
+ 18x"007d6", 18x"00752", 18x"006d0", 18x"0064e", 18x"005cc", 18x"0054a", 18x"004c8", 18x"00446",
+ 18x"003c4", 18x"00342", 18x"002c2", 18x"00240", 18x"001c0", 18x"00140", 18x"000c0", 18x"00040"
+ );
+
+ -- Left and right shifter with 120 bit input and 64 bit output.
+ -- Shifts inp left by shift bits and returns the upper 64 bits of
+ -- the result. The shift parameter is interpreted as a signed
+ -- number in the range -64..63, with negative values indicating
+ -- right shifts.
+ function shifter_64(inp: std_ulogic_vector(119 downto 0);
+ shift: std_ulogic_vector(6 downto 0))
+ return std_ulogic_vector is
+ variable s1 : std_ulogic_vector(94 downto 0);
+ variable s2 : std_ulogic_vector(70 downto 0);
+ variable result : std_ulogic_vector(63 downto 0);
+ begin
+ case shift(6 downto 5) is
+ when "00" =>
+ s1 := inp(119 downto 25);
+ when "01" =>
+ s1 := inp(87 downto 0) & "0000000";
+ when "10" =>
+ s1 := x"0000000000000000" & inp(119 downto 89);
+ when others =>
+ s1 := x"00000000" & inp(119 downto 57);
+ end case;
+ case shift(4 downto 3) is
+ when "00" =>
+ s2 := s1(94 downto 24);
+ when "01" =>
+ s2 := s1(86 downto 16);
+ when "10" =>
+ s2 := s1(78 downto 8);
+ when others =>
+ s2 := s1(70 downto 0);
+ end case;
+ case shift(2 downto 0) is
+ when "000" =>
+ result := s2(70 downto 7);
+ when "001" =>
+ result := s2(69 downto 6);
+ when "010" =>
+ result := s2(68 downto 5);
+ when "011" =>
+ result := s2(67 downto 4);
+ when "100" =>
+ result := s2(66 downto 3);
+ when "101" =>
+ result := s2(65 downto 2);
+ when "110" =>
+ result := s2(64 downto 1);
+ when others =>
+ result := s2(63 downto 0);
+ end case;
+ return result;
+ end;
+
+ -- Generate a mask with 0-bits on the left and 1-bits on the right which
+ -- selects the bits will be lost in doing a right shift. The shift
+ -- parameter is the bottom 6 bits of a negative shift count,
+ -- indicating a right shift.
+ function right_mask(shift: unsigned(5 downto 0)) return std_ulogic_vector is
+ variable result: std_ulogic_vector(63 downto 0);
+ begin
+ result := (others => '0');
+ for i in 0 to 63 loop
+ if i >= shift then
+ result(63 - i) := '1';
+ end if;
+ end loop;
+ return result;
+ end;
-- Split a DP floating-point number into components and work out its class.
-- If is_int = 1, the input is considered an integer
-- Construct a DP floating-point result from components
function pack_dp(sign: std_ulogic; class: fp_number_class; exp: signed(EXP_BITS-1 downto 0);
- mantissa: std_ulogic_vector) return std_ulogic_vector is
+ mantissa: std_ulogic_vector; single_prec: std_ulogic; quieten_nan: std_ulogic)
+ return std_ulogic_vector is
variable result : std_ulogic_vector(63 downto 0);
begin
result := (others => '0');
-- normalized number
result(62 downto 52) := std_ulogic_vector(resize(exp, 11) + 1023);
end if;
- result(51 downto 0) := mantissa(53 downto 2);
+ result(51 downto 29) := mantissa(53 downto 31);
+ if single_prec = '0' then
+ result(28 downto 0) := mantissa(30 downto 2);
+ end if;
when INFINITY =>
result(62 downto 52) := "11111111111";
when NAN =>
result(62 downto 52) := "11111111111";
- result(51 downto 0) := mantissa(53 downto 2);
+ result(51) := quieten_nan or mantissa(53);
+ result(50 downto 29) := mantissa(52 downto 31);
+ if single_prec = '0' then
+ result(28 downto 0) := mantissa(30 downto 2);
+ end if;
end case;
return result;
end;
+ -- Determine whether to increment when rounding
+ -- Returns rounding_inc & inexact
+ -- Assumes x includes the bottom 29 bits of the mantissa already
+ -- if single_prec = 1 (usually arranged by setting set_x = 1 earlier).
+ function fp_rounding(mantissa: std_ulogic_vector(63 downto 0); x: std_ulogic;
+ single_prec: std_ulogic; rn: std_ulogic_vector(2 downto 0);
+ sign: std_ulogic)
+ return std_ulogic_vector is
+ variable grx : std_ulogic_vector(2 downto 0);
+ variable ret : std_ulogic_vector(1 downto 0);
+ variable lsb : std_ulogic;
+ begin
+ if single_prec = '0' then
+ grx := mantissa(1 downto 0) & x;
+ lsb := mantissa(2);
+ else
+ grx := mantissa(30 downto 29) & x;
+ lsb := mantissa(31);
+ end if;
+ ret(1) := '0';
+ ret(0) := or (grx);
+ case rn(1 downto 0) is
+ when "00" => -- round to nearest
+ if grx = "100" and rn(2) = '0' then
+ ret(1) := lsb; -- tie, round to even
+ else
+ ret(1) := grx(2);
+ end if;
+ when "01" => -- round towards zero
+ when others => -- round towards +/- inf
+ if rn(0) = sign then
+ -- round towards greater magnitude
+ ret(1) := ret(0);
+ end if;
+ end case;
+ return ret;
+ end;
+
+ -- Determine result flags to write into the FPSCR
+ function result_flags(sign: std_ulogic; class: fp_number_class; unitbit: std_ulogic)
+ return std_ulogic_vector is
+ begin
+ case class is
+ when ZERO =>
+ return sign & "0010";
+ when FINITE =>
+ return (not unitbit) & sign & (not sign) & "00";
+ when INFINITY =>
+ return '0' & sign & (not sign) & "01";
+ when NAN =>
+ return "10001";
+ end case;
+ end;
+
begin
+ fpu_multiply_0: entity work.multiply
+ port map (
+ clk => clk,
+ m_in => f_to_multiply,
+ m_out => multiply_to_f
+ );
+
fpu_0: process(clk)
begin
if rising_edge(clk) then
end if;
end process;
+ -- synchronous reads from lookup table
+ lut_access: process(clk)
+ variable addrhi : std_ulogic_vector(1 downto 0);
+ variable addr : std_ulogic_vector(9 downto 0);
+ begin
+ if rising_edge(clk) then
+ if r.is_sqrt = '1' then
+ addrhi := r.b.mantissa(55 downto 54);
+ else
+ addrhi := "00";
+ end if;
+ addr := addrhi & r.b.mantissa(53 downto 46);
+ inverse_est <= '1' & inverse_table(to_integer(unsigned(addr)));
+ end if;
+ end process;
+
e_out.busy <= r.busy;
e_out.exception <= r.fpscr(FPSCR_FEX);
- e_out.interrupt <= r.do_intr;
w_out.valid <= r.instr_done and not r.do_intr;
+ w_out.instr_tag <= r.instr_tag;
w_out.write_enable <= r.writing_back;
w_out.write_reg <= r.dest_fpr;
w_out.write_data <= fp_result;
w_out.write_cr_mask <= r.cr_mask;
w_out.write_cr_data <= r.cr_result & r.cr_result & r.cr_result & r.cr_result &
r.cr_result & r.cr_result & r.cr_result & r.cr_result;
+ w_out.interrupt <= r.do_intr;
+ w_out.intr_vec <= 16#700#;
+ w_out.srr0 <= r.nia;
+ w_out.srr1 <= (47-44 => r.illegal, 47-43 => not r.illegal, others => '0');
fpu_1: process(all)
variable v : reg_type;
variable adec : fpu_reg_type;
variable bdec : fpu_reg_type;
+ variable cdec : fpu_reg_type;
variable fpscr_mask : std_ulogic_vector(31 downto 0);
variable illegal : std_ulogic;
variable j, k : integer;
variable flm : std_ulogic_vector(7 downto 0);
variable int_input : std_ulogic;
+ variable mask : std_ulogic_vector(63 downto 0);
+ variable in_a0 : std_ulogic_vector(63 downto 0);
+ variable in_b0 : std_ulogic_vector(63 downto 0);
+ variable misc : std_ulogic_vector(63 downto 0);
+ variable shift_res : std_ulogic_vector(63 downto 0);
+ variable round : std_ulogic_vector(1 downto 0);
+ variable update_fx : std_ulogic;
+ variable arith_done : std_ulogic;
+ variable invalid : std_ulogic;
+ variable zero_divide : std_ulogic;
+ variable mant_nz : std_ulogic;
+ variable min_exp : signed(EXP_BITS-1 downto 0);
+ variable max_exp : signed(EXP_BITS-1 downto 0);
+ variable bias_exp : signed(EXP_BITS-1 downto 0);
+ variable new_exp : signed(EXP_BITS-1 downto 0);
+ variable exp_tiny : std_ulogic;
+ variable exp_huge : std_ulogic;
+ variable renormalize : std_ulogic;
+ variable clz : std_ulogic_vector(5 downto 0);
+ variable set_x : std_ulogic;
+ variable mshift : signed(EXP_BITS-1 downto 0);
+ variable need_check : std_ulogic;
+ variable msb : std_ulogic;
+ variable is_add : std_ulogic;
+ variable set_a : std_ulogic;
+ variable set_b : std_ulogic;
+ variable set_c : std_ulogic;
+ variable set_y : std_ulogic;
+ variable set_s : std_ulogic;
+ variable qnan_result : std_ulogic;
+ variable px_nz : std_ulogic;
+ variable pcmpb_eq : std_ulogic;
+ variable pcmpb_lt : std_ulogic;
+ variable pshift : std_ulogic;
+ variable renorm_sqrt : std_ulogic;
+ variable sqrt_exp : signed(EXP_BITS-1 downto 0);
+ variable shiftin : std_ulogic;
+ variable mulexp : signed(EXP_BITS-1 downto 0);
+ variable maddend : std_ulogic_vector(127 downto 0);
+ variable sum : std_ulogic_vector(63 downto 0);
+ variable round_inc : std_ulogic_vector(63 downto 0);
begin
v := r;
illegal := '0';
-- capture incoming instruction
if e_in.valid = '1' then
v.insn := e_in.insn;
+ v.nia := e_in.nia;
v.op := e_in.op;
+ v.instr_tag := e_in.itag;
v.fe_mode := or (e_in.fe_mode);
v.dest_fpr := e_in.frt;
v.single_prec := e_in.single;
+ v.longmask := e_in.single;
v.int_result := '0';
v.rc := e_in.rc;
v.is_cmp := e_in.out_cr;
if e_in.op = OP_FPOP_I then
int_input := '1';
end if;
+ v.quieten_nan := '1';
+ v.tiny := '0';
+ v.denorm := '0';
+ v.round_mode := '0' & r.fpscr(FPSCR_RN+1 downto FPSCR_RN);
+ v.is_subtract := '0';
+ v.is_multiply := '0';
+ v.is_sqrt := '0';
+ v.add_bsmall := '0';
+ v.doing_ftdiv := "00";
+
adec := decode_dp(e_in.fra, int_input);
bdec := decode_dp(e_in.frb, int_input);
+ cdec := decode_dp(e_in.frc, int_input);
v.a := adec;
v.b := bdec;
+ v.c := cdec;
+
+ v.exp_cmp := '0';
+ if adec.exponent > bdec.exponent then
+ v.exp_cmp := '1';
+ end if;
+ v.madd_cmp := '0';
+ if (adec.exponent + cdec.exponent + 1) >= bdec.exponent then
+ v.madd_cmp := '1';
+ end if;
+ end if;
+
+ r_hi_nz <= or (r.r(55 downto 31));
+ r_lo_nz <= or (r.r(30 downto 2));
+ s_nz <= or (r.s);
+
+ if r.single_prec = '0' then
+ if r.doing_ftdiv(1) = '0' then
+ max_exp := to_signed(1023, EXP_BITS);
+ else
+ max_exp := to_signed(1020, EXP_BITS);
+ end if;
+ if r.doing_ftdiv(0) = '0' then
+ min_exp := to_signed(-1022, EXP_BITS);
+ else
+ min_exp := to_signed(-1021, EXP_BITS);
+ end if;
+ bias_exp := to_signed(1536, EXP_BITS);
+ else
+ max_exp := to_signed(127, EXP_BITS);
+ min_exp := to_signed(-126, EXP_BITS);
+ bias_exp := to_signed(192, EXP_BITS);
+ end if;
+ new_exp := r.result_exp - r.shift;
+ exp_tiny := '0';
+ exp_huge := '0';
+ if new_exp < min_exp then
+ exp_tiny := '1';
+ end if;
+ if new_exp > max_exp then
+ exp_huge := '1';
+ end if;
+
+ -- Compare P with zero and with B
+ px_nz := or (r.p(57 downto 4));
+ pcmpb_eq := '0';
+ if r.p(59 downto 4) = r.b.mantissa(55 downto 0) then
+ pcmpb_eq := '1';
+ end if;
+ pcmpb_lt := '0';
+ if unsigned(r.p(59 downto 4)) < unsigned(r.b.mantissa(55 downto 0)) then
+ pcmpb_lt := '1';
end if;
v.writing_back := '0';
v.instr_done := '0';
- opsel_r <= "00";
+ v.update_fprf := '0';
+ v.shift := to_signed(0, EXP_BITS);
+ v.first := '0';
+ v.opsel_a := AIN_R;
+ opsel_ainv <= '0';
+ opsel_mask <= '0';
+ opsel_b <= BIN_ZERO;
+ opsel_binv <= '0';
+ opsel_r <= RES_SUM;
+ opsel_s <= S_ZERO;
+ carry_in <= '0';
+ misc_sel <= "0000";
fpscr_mask := (others => '1');
-
+ update_fx := '0';
+ arith_done := '0';
+ invalid := '0';
+ zero_divide := '0';
+ renormalize := '0';
+ set_x := '0';
+ qnan_result := '0';
+ set_a := '0';
+ set_b := '0';
+ set_c := '0';
+ set_s := '0';
+ f_to_multiply.is_32bit <= '0';
+ f_to_multiply.valid <= '0';
+ msel_1 <= MUL1_A;
+ msel_2 <= MUL2_C;
+ msel_add <= MULADD_ZERO;
+ msel_inv <= '0';
+ set_y := '0';
+ pshift := '0';
+ renorm_sqrt := '0';
+ shiftin := '0';
case r.state is
when IDLE =>
+ v.use_a := '0';
+ v.use_b := '0';
+ v.use_c := '0';
+ v.invalid := '0';
+ v.negate := '0';
if e_in.valid = '1' then
case e_in.insn(5 downto 1) is
when "00000" =>
- v.state := DO_MCRFS;
+ if e_in.insn(8) = '1' then
+ if e_in.insn(6) = '0' then
+ v.state := DO_FTDIV;
+ else
+ v.state := DO_FTSQRT;
+ end if;
+ elsif e_in.insn(7) = '1' then
+ v.state := DO_MCRFS;
+ else
+ v.opsel_a := AIN_B;
+ v.state := DO_FCMP;
+ end if;
when "00110" =>
- if e_in.insn(8) = '0' then
- v.state := DO_MTFSB;
+ if e_in.insn(10) = '0' then
+ if e_in.insn(8) = '0' then
+ v.state := DO_MTFSB;
+ else
+ v.state := DO_MTFSFI;
+ end if;
else
- v.state := DO_MTFSFI;
+ v.state := DO_FMRG;
end if;
when "00111" =>
if e_in.insn(8) = '0' then
v.state := DO_MTFSF;
end if;
when "01000" =>
- v.state := DO_FMR;
+ v.opsel_a := AIN_B;
+ if e_in.insn(9 downto 8) /= "11" then
+ v.state := DO_FMR;
+ else
+ v.state := DO_FRI;
+ end if;
+ when "01100" =>
+ v.opsel_a := AIN_B;
+ v.state := DO_FRSP;
+ when "01110" =>
+ v.opsel_a := AIN_B;
+ if int_input = '1' then
+ -- fcfid[u][s]
+ v.state := DO_FCFID;
+ else
+ v.state := DO_FCTI;
+ end if;
+ when "01111" =>
+ v.round_mode := "001";
+ v.opsel_a := AIN_B;
+ v.state := DO_FCTI;
+ when "10010" =>
+ v.opsel_a := AIN_A;
+ if v.b.mantissa(54) = '0' and v.a.mantissa(54) = '1' then
+ v.opsel_a := AIN_B;
+ end if;
+ v.state := DO_FDIV;
+ when "10100" | "10101" =>
+ v.opsel_a := AIN_A;
+ v.state := DO_FADD;
+ when "10110" =>
+ v.is_sqrt := '1';
+ v.opsel_a := AIN_B;
+ v.state := DO_FSQRT;
+ when "10111" =>
+ v.state := DO_FSEL;
+ when "11000" =>
+ v.opsel_a := AIN_B;
+ v.state := DO_FRE;
+ when "11001" =>
+ v.is_multiply := '1';
+ v.opsel_a := AIN_A;
+ if v.c.mantissa(54) = '0' and v.a.mantissa(54) = '1' then
+ v.opsel_a := AIN_C;
+ end if;
+ v.state := DO_FMUL;
+ when "11010" =>
+ v.is_sqrt := '1';
+ v.opsel_a := AIN_B;
+ v.state := DO_FRSQRTE;
+ when "11100" | "11101" | "11110" | "11111" =>
+ if v.a.mantissa(54) = '0' then
+ v.opsel_a := AIN_A;
+ elsif v.c.mantissa(54) = '0' then
+ v.opsel_a := AIN_C;
+ else
+ v.opsel_a := AIN_B;
+ end if;
+ v.state := DO_FMADD;
when others =>
illegal := '1';
end case;
end if;
+ v.x := '0';
+ v.old_exc := r.fpscr(FPSCR_VX downto FPSCR_XX);
+ set_s := '1';
when DO_MCRFS =>
j := to_integer(unsigned(insn_bfa(r.insn)));
v.instr_done := '1';
v.state := IDLE;
+ when DO_FTDIV =>
+ v.instr_done := '1';
+ v.state := IDLE;
+ v.cr_result := "0000";
+ if r.a.class = INFINITY or r.b.class = ZERO or r.b.class = INFINITY or
+ (r.b.class = FINITE and r.b.mantissa(53) = '0') then
+ v.cr_result(2) := '1';
+ end if;
+ if r.a.class = NAN or r.a.class = INFINITY or
+ r.b.class = NAN or r.b.class = ZERO or r.b.class = INFINITY or
+ (r.a.class = FINITE and r.a.exponent <= to_signed(-970, EXP_BITS)) then
+ v.cr_result(1) := '1';
+ else
+ v.doing_ftdiv := "11";
+ v.first := '1';
+ v.state := FTDIV_1;
+ v.instr_done := '0';
+ end if;
+
+ when DO_FTSQRT =>
+ v.instr_done := '1';
+ v.state := IDLE;
+ v.cr_result := "0000";
+ if r.b.class = ZERO or r.b.class = INFINITY or
+ (r.b.class = FINITE and r.b.mantissa(53) = '0') then
+ v.cr_result(2) := '1';
+ end if;
+ if r.b.class = NAN or r.b.class = INFINITY or r.b.class = ZERO
+ or r.b.negative = '1' or r.b.exponent <= to_signed(-970, EXP_BITS) then
+ v.cr_result(1) := '0';
+ end if;
+
+ when DO_FCMP =>
+ -- fcmp[uo]
+ -- r.opsel_a = AIN_B
+ v.instr_done := '1';
+ v.state := IDLE;
+ update_fx := '1';
+ v.result_exp := r.b.exponent;
+ if (r.a.class = NAN and r.a.mantissa(53) = '0') or
+ (r.b.class = NAN and r.b.mantissa(53) = '0') then
+ -- Signalling NAN
+ v.fpscr(FPSCR_VXSNAN) := '1';
+ if r.insn(6) = '1' and r.fpscr(FPSCR_VE) = '0' then
+ v.fpscr(FPSCR_VXVC) := '1';
+ end if;
+ invalid := '1';
+ v.cr_result := "0001"; -- unordered
+ elsif r.a.class = NAN or r.b.class = NAN then
+ if r.insn(6) = '1' then
+ -- fcmpo
+ v.fpscr(FPSCR_VXVC) := '1';
+ invalid := '1';
+ end if;
+ v.cr_result := "0001"; -- unordered
+ elsif r.a.class = ZERO and r.b.class = ZERO then
+ v.cr_result := "0010"; -- equal
+ elsif r.a.negative /= r.b.negative then
+ v.cr_result := r.a.negative & r.b.negative & "00";
+ elsif r.a.class = ZERO then
+ -- A and B are the same sign from here down
+ v.cr_result := not r.b.negative & r.b.negative & "00";
+ elsif r.a.class = INFINITY then
+ if r.b.class = INFINITY then
+ v.cr_result := "0010";
+ else
+ v.cr_result := r.a.negative & not r.a.negative & "00";
+ end if;
+ elsif r.b.class = ZERO then
+ -- A is finite from here down
+ v.cr_result := r.a.negative & not r.a.negative & "00";
+ elsif r.b.class = INFINITY then
+ v.cr_result := not r.b.negative & r.b.negative & "00";
+ elsif r.exp_cmp = '1' then
+ -- A and B are both finite from here down
+ v.cr_result := r.a.negative & not r.a.negative & "00";
+ elsif r.a.exponent /= r.b.exponent then
+ -- A exponent is smaller than B
+ v.cr_result := not r.a.negative & r.a.negative & "00";
+ else
+ -- Prepare to subtract mantissas, put B in R
+ v.cr_result := "0000";
+ v.instr_done := '0';
+ v.opsel_a := AIN_A;
+ v.state := CMP_1;
+ end if;
+ v.fpscr(FPSCR_FL downto FPSCR_FU) := v.cr_result;
+
when DO_MTFSB =>
-- mtfsb{0,1}
j := to_integer(unsigned(insn_bt(r.insn)));
v.instr_done := '1';
v.state := IDLE;
+ when DO_FMRG =>
+ -- fmrgew, fmrgow
+ opsel_r <= RES_MISC;
+ misc_sel <= "01" & r.insn(8) & '0';
+ v.int_result := '1';
+ v.writing_back := '1';
+ v.instr_done := '1';
+ v.state := IDLE;
+
when DO_MFFS =>
v.int_result := '1';
v.writing_back := '1';
- opsel_r <= "10";
+ opsel_r <= RES_MISC;
case r.insn(20 downto 16) is
when "00000" =>
-- mffs
v.state := IDLE;
when DO_FMR =>
+ -- r.opsel_a = AIN_B
v.result_class := r.b.class;
v.result_exp := r.b.exponent;
+ v.quieten_nan := '0';
if r.insn(9) = '1' then
v.result_sign := '0'; -- fabs
elsif r.insn(8) = '1' then
v.instr_done := '1';
v.state := IDLE;
+ when DO_FRI => -- fri[nzpm]
+ -- r.opsel_a = AIN_B
+ v.result_class := r.b.class;
+ v.result_sign := r.b.negative;
+ v.result_exp := r.b.exponent;
+ v.fpscr(FPSCR_FR) := '0';
+ v.fpscr(FPSCR_FI) := '0';
+ if r.b.class = NAN and r.b.mantissa(53) = '0' then
+ -- Signalling NAN
+ v.fpscr(FPSCR_VXSNAN) := '1';
+ invalid := '1';
+ end if;
+ if r.b.class = FINITE then
+ if r.b.exponent >= to_signed(52, EXP_BITS) then
+ -- integer already, no rounding required
+ arith_done := '1';
+ else
+ v.shift := r.b.exponent - to_signed(52, EXP_BITS);
+ v.state := FRI_1;
+ v.round_mode := '1' & r.insn(7 downto 6);
+ end if;
+ else
+ arith_done := '1';
+ end if;
+
+ when DO_FRSP =>
+ -- r.opsel_a = AIN_B, r.shift = 0
+ v.result_class := r.b.class;
+ v.result_sign := r.b.negative;
+ v.result_exp := r.b.exponent;
+ v.fpscr(FPSCR_FR) := '0';
+ v.fpscr(FPSCR_FI) := '0';
+ if r.b.class = NAN and r.b.mantissa(53) = '0' then
+ -- Signalling NAN
+ v.fpscr(FPSCR_VXSNAN) := '1';
+ invalid := '1';
+ end if;
+ set_x := '1';
+ if r.b.class = FINITE then
+ if r.b.exponent < to_signed(-126, EXP_BITS) then
+ v.shift := r.b.exponent - to_signed(-126, EXP_BITS);
+ v.state := ROUND_UFLOW;
+ elsif r.b.exponent > to_signed(127, EXP_BITS) then
+ v.state := ROUND_OFLOW;
+ else
+ v.state := ROUNDING;
+ end if;
+ else
+ arith_done := '1';
+ end if;
+
+ when DO_FCTI =>
+ -- instr bit 9: 1=dword 0=word
+ -- instr bit 8: 1=unsigned 0=signed
+ -- instr bit 1: 1=round to zero 0=use fpscr[RN]
+ -- r.opsel_a = AIN_B
+ v.result_class := r.b.class;
+ v.result_sign := r.b.negative;
+ v.result_exp := r.b.exponent;
+ v.fpscr(FPSCR_FR) := '0';
+ v.fpscr(FPSCR_FI) := '0';
+ if r.b.class = NAN and r.b.mantissa(53) = '0' then
+ -- Signalling NAN
+ v.fpscr(FPSCR_VXSNAN) := '1';
+ invalid := '1';
+ end if;
+
+ v.int_result := '1';
+ case r.b.class is
+ when ZERO =>
+ arith_done := '1';
+ when FINITE =>
+ if r.b.exponent >= to_signed(64, EXP_BITS) or
+ (r.insn(9) = '0' and r.b.exponent >= to_signed(32, EXP_BITS)) then
+ v.state := INT_OFLOW;
+ elsif r.b.exponent >= to_signed(52, EXP_BITS) then
+ -- integer already, no rounding required,
+ -- shift into final position
+ v.shift := r.b.exponent - to_signed(54, EXP_BITS);
+ if r.insn(8) = '1' and r.b.negative = '1' then
+ v.state := INT_OFLOW;
+ else
+ v.state := INT_ISHIFT;
+ end if;
+ else
+ v.shift := r.b.exponent - to_signed(52, EXP_BITS);
+ v.state := INT_SHIFT;
+ end if;
+ when INFINITY | NAN =>
+ v.state := INT_OFLOW;
+ end case;
+
+ when DO_FCFID =>
+ -- r.opsel_a = AIN_B
+ v.result_sign := '0';
+ if r.insn(8) = '0' and r.b.negative = '1' then
+ -- fcfid[s] with negative operand, set R = -B
+ opsel_ainv <= '1';
+ carry_in <= '1';
+ v.result_sign := '1';
+ end if;
+ v.result_class := r.b.class;
+ v.result_exp := to_signed(54, EXP_BITS);
+ v.fpscr(FPSCR_FR) := '0';
+ v.fpscr(FPSCR_FI) := '0';
+ if r.b.class = ZERO then
+ arith_done := '1';
+ else
+ v.state := FINISH;
+ end if;
+
+ when DO_FADD =>
+ -- fadd[s] and fsub[s]
+ -- r.opsel_a = AIN_A
+ v.result_sign := r.a.negative;
+ v.result_class := r.a.class;
+ v.result_exp := r.a.exponent;
+ v.fpscr(FPSCR_FR) := '0';
+ v.fpscr(FPSCR_FI) := '0';
+ v.use_a := '1';
+ v.use_b := '1';
+ is_add := r.a.negative xor r.b.negative xor r.insn(1);
+ if r.a.class = FINITE and r.b.class = FINITE then
+ v.is_subtract := not is_add;
+ v.add_bsmall := r.exp_cmp;
+ v.opsel_a := AIN_B;
+ if r.exp_cmp = '0' then
+ v.shift := r.a.exponent - r.b.exponent;
+ v.result_sign := r.b.negative xnor r.insn(1);
+ if r.a.exponent = r.b.exponent then
+ v.state := ADD_2;
+ else
+ v.longmask := '0';
+ v.state := ADD_SHIFT;
+ end if;
+ else
+ v.state := ADD_1;
+ end if;
+ else
+ if r.a.class = NAN or r.b.class = NAN then
+ v.state := NAN_RESULT;
+ elsif r.a.class = INFINITY and r.b.class = INFINITY and is_add = '0' then
+ -- invalid operation, construct QNaN
+ v.fpscr(FPSCR_VXISI) := '1';
+ qnan_result := '1';
+ arith_done := '1';
+ elsif r.a.class = ZERO and r.b.class = ZERO and is_add = '0' then
+ -- return -0 for rounding to -infinity
+ v.result_sign := r.round_mode(1) and r.round_mode(0);
+ arith_done := '1';
+ elsif r.a.class = INFINITY or r.b.class = ZERO then
+ -- result is A
+ v.opsel_a := AIN_A;
+ v.state := EXC_RESULT;
+ else
+ -- result is +/- B
+ v.opsel_a := AIN_B;
+ v.negate := not r.insn(1);
+ v.state := EXC_RESULT;
+ end if;
+ end if;
+
+ when DO_FMUL =>
+ -- fmul[s]
+ -- r.opsel_a = AIN_A unless C is denorm and A isn't
+ v.result_sign := r.a.negative xor r.c.negative;
+ v.result_class := r.a.class;
+ v.fpscr(FPSCR_FR) := '0';
+ v.fpscr(FPSCR_FI) := '0';
+ v.use_a := '1';
+ v.use_c := '1';
+ if r.a.class = FINITE and r.c.class = FINITE then
+ v.result_exp := r.a.exponent + r.c.exponent;
+ -- Renormalize denorm operands
+ if r.a.mantissa(54) = '0' then
+ v.state := RENORM_A;
+ elsif r.c.mantissa(54) = '0' then
+ v.state := RENORM_C;
+ else
+ f_to_multiply.valid <= '1';
+ v.state := MULT_1;
+ end if;
+ else
+ if r.a.class = NAN or r.c.class = NAN then
+ v.state := NAN_RESULT;
+ elsif (r.a.class = INFINITY and r.c.class = ZERO) or
+ (r.a.class = ZERO and r.c.class = INFINITY) then
+ -- invalid operation, construct QNaN
+ v.fpscr(FPSCR_VXIMZ) := '1';
+ qnan_result := '1';
+ elsif r.a.class = ZERO or r.a.class = INFINITY then
+ -- result is +/- A
+ arith_done := '1';
+ else
+ -- r.c.class is ZERO or INFINITY
+ v.opsel_a := AIN_C;
+ v.negate := r.a.negative;
+ v.state := EXC_RESULT;
+ end if;
+ end if;
+
+ when DO_FDIV =>
+ -- r.opsel_a = AIN_A unless B is denorm and A isn't
+ v.result_class := r.a.class;
+ v.fpscr(FPSCR_FR) := '0';
+ v.fpscr(FPSCR_FI) := '0';
+ v.use_a := '1';
+ v.use_b := '1';
+ v.result_sign := r.a.negative xor r.b.negative;
+ v.result_exp := r.a.exponent - r.b.exponent;
+ v.count := "00";
+ if r.a.class = FINITE and r.b.class = FINITE then
+ -- Renormalize denorm operands
+ if r.a.mantissa(54) = '0' then
+ v.state := RENORM_A;
+ elsif r.b.mantissa(54) = '0' then
+ v.state := RENORM_B;
+ else
+ v.first := '1';
+ v.state := DIV_2;
+ end if;
+ else
+ if r.a.class = NAN or r.b.class = NAN then
+ v.state := NAN_RESULT;
+ elsif r.b.class = INFINITY then
+ if r.a.class = INFINITY then
+ v.fpscr(FPSCR_VXIDI) := '1';
+ qnan_result := '1';
+ else
+ v.result_class := ZERO;
+ end if;
+ arith_done := '1';
+ elsif r.b.class = ZERO then
+ if r.a.class = ZERO then
+ v.fpscr(FPSCR_VXZDZ) := '1';
+ qnan_result := '1';
+ else
+ if r.a.class = FINITE then
+ zero_divide := '1';
+ end if;
+ v.result_class := INFINITY;
+ end if;
+ arith_done := '1';
+ else -- r.b.class = FINITE, result_class = r.a.class
+ arith_done := '1';
+ end if;
+ end if;
+
+ when DO_FSEL =>
+ v.fpscr(FPSCR_FR) := '0';
+ v.fpscr(FPSCR_FI) := '0';
+ if r.a.class = ZERO or (r.a.negative = '0' and r.a.class /= NAN) then
+ v.opsel_a := AIN_C;
+ else
+ v.opsel_a := AIN_B;
+ end if;
+ v.quieten_nan := '0';
+ v.state := EXC_RESULT;
+
+ when DO_FSQRT =>
+ -- r.opsel_a = AIN_B
+ v.result_class := r.b.class;
+ v.result_sign := r.b.negative;
+ v.fpscr(FPSCR_FR) := '0';
+ v.fpscr(FPSCR_FI) := '0';
+ v.use_b := '1';
+ case r.b.class is
+ when FINITE =>
+ v.result_exp := r.b.exponent;
+ if r.b.negative = '1' then
+ v.fpscr(FPSCR_VXSQRT) := '1';
+ qnan_result := '1';
+ elsif r.b.mantissa(54) = '0' then
+ v.state := RENORM_B;
+ elsif r.b.exponent(0) = '0' then
+ v.state := SQRT_1;
+ else
+ v.shift := to_signed(1, EXP_BITS);
+ v.state := RENORM_B2;
+ end if;
+ when NAN =>
+ v.state := NAN_RESULT;
+ when ZERO =>
+ -- result is B
+ arith_done := '1';
+ when INFINITY =>
+ if r.b.negative = '1' then
+ v.fpscr(FPSCR_VXSQRT) := '1';
+ qnan_result := '1';
+ -- else result is B
+ end if;
+ arith_done := '1';
+ end case;
+
+ when DO_FRE =>
+ -- r.opsel_a = AIN_B
+ v.result_class := r.b.class;
+ v.result_sign := r.b.negative;
+ v.fpscr(FPSCR_FR) := '0';
+ v.fpscr(FPSCR_FI) := '0';
+ v.use_b := '1';
+ case r.b.class is
+ when FINITE =>
+ v.result_exp := - r.b.exponent;
+ if r.b.mantissa(54) = '0' then
+ v.state := RENORM_B;
+ else
+ v.state := FRE_1;
+ end if;
+ when NAN =>
+ v.state := NAN_RESULT;
+ when INFINITY =>
+ v.result_class := ZERO;
+ arith_done := '1';
+ when ZERO =>
+ v.result_class := INFINITY;
+ zero_divide := '1';
+ arith_done := '1';
+ end case;
+
+ when DO_FRSQRTE =>
+ -- r.opsel_a = AIN_B
+ v.result_class := r.b.class;
+ v.result_sign := r.b.negative;
+ v.fpscr(FPSCR_FR) := '0';
+ v.fpscr(FPSCR_FI) := '0';
+ v.use_b := '1';
+ v.shift := to_signed(1, EXP_BITS);
+ case r.b.class is
+ when FINITE =>
+ v.result_exp := r.b.exponent;
+ if r.b.negative = '1' then
+ v.fpscr(FPSCR_VXSQRT) := '1';
+ qnan_result := '1';
+ elsif r.b.mantissa(54) = '0' then
+ v.state := RENORM_B;
+ elsif r.b.exponent(0) = '0' then
+ v.state := RSQRT_1;
+ else
+ v.state := RENORM_B2;
+ end if;
+ when NAN =>
+ v.state := NAN_RESULT;
+ when INFINITY =>
+ if r.b.negative = '1' then
+ v.fpscr(FPSCR_VXSQRT) := '1';
+ qnan_result := '1';
+ else
+ v.result_class := ZERO;
+ end if;
+ arith_done := '1';
+ when ZERO =>
+ v.result_class := INFINITY;
+ zero_divide := '1';
+ arith_done := '1';
+ end case;
+
+ when DO_FMADD =>
+ -- fmadd, fmsub, fnmadd, fnmsub
+ -- r.opsel_a = AIN_A if A is denorm, else AIN_C if C is denorm,
+ -- else AIN_B
+ v.result_sign := r.a.negative;
+ v.result_class := r.a.class;
+ v.result_exp := r.a.exponent;
+ v.fpscr(FPSCR_FR) := '0';
+ v.fpscr(FPSCR_FI) := '0';
+ v.use_a := '1';
+ v.use_b := '1';
+ v.use_c := '1';
+ is_add := r.a.negative xor r.c.negative xor r.b.negative xor r.insn(1);
+ if r.a.class = FINITE and r.c.class = FINITE and
+ (r.b.class = FINITE or r.b.class = ZERO) then
+ v.is_subtract := not is_add;
+ mulexp := r.a.exponent + r.c.exponent;
+ v.result_exp := mulexp;
+ -- Make sure A and C are normalized
+ if r.a.mantissa(54) = '0' then
+ v.state := RENORM_A;
+ elsif r.c.mantissa(54) = '0' then
+ v.state := RENORM_C;
+ elsif r.b.class = ZERO then
+ -- no addend, degenerates to multiply
+ v.result_sign := r.a.negative xor r.c.negative xor r.insn(2);
+ f_to_multiply.valid <= '1';
+ v.is_multiply := '1';
+ v.state := MULT_1;
+ elsif r.madd_cmp = '0' then
+ -- addend is bigger, do multiply first
+ v.result_sign := not (r.b.negative xor r.insn(1) xor r.insn(2));
+ f_to_multiply.valid <= '1';
+ v.state := FMADD_1;
+ else
+ -- product is bigger, shift B right and use it as the
+ -- addend to the multiplier
+ v.shift := r.b.exponent - mulexp + to_signed(64, EXP_BITS);
+ -- for subtract, multiplier does B - A * C
+ v.result_sign := not (r.a.negative xor r.c.negative xor r.insn(2) xor is_add);
+ v.result_exp := r.b.exponent;
+ v.state := FMADD_2;
+ end if;
+ else
+ if r.a.class = NAN or r.b.class = NAN or r.c.class = NAN then
+ v.state := NAN_RESULT;
+ elsif (r.a.class = ZERO and r.c.class = INFINITY) or
+ (r.a.class = INFINITY and r.c.class = ZERO) then
+ -- invalid operation, construct QNaN
+ v.fpscr(FPSCR_VXIMZ) := '1';
+ qnan_result := '1';
+ elsif r.a.class = INFINITY or r.c.class = INFINITY then
+ if r.b.class = INFINITY and is_add = '0' then
+ -- invalid operation, construct QNaN
+ v.fpscr(FPSCR_VXISI) := '1';
+ qnan_result := '1';
+ else
+ -- result is infinity
+ v.result_class := INFINITY;
+ v.result_sign := r.a.negative xor r.c.negative xor r.insn(2);
+ arith_done := '1';
+ end if;
+ else
+ -- Here A is zero, C is zero, or B is infinity
+ -- Result is +/-B in all of those cases
+ v.opsel_a := AIN_B;
+ if r.b.class /= ZERO or is_add = '1' then
+ v.negate := not (r.insn(1) xor r.insn(2));
+ else
+ -- have to be careful about rule for 0 - 0 result sign
+ v.negate := r.b.negative xor (r.round_mode(1) and r.round_mode(0)) xor r.insn(2);
+ end if;
+ v.state := EXC_RESULT;
+ end if;
+ end if;
+
+ when RENORM_A =>
+ renormalize := '1';
+ v.state := RENORM_A2;
+ if r.insn(4) = '1' then
+ v.opsel_a := AIN_C;
+ else
+ v.opsel_a := AIN_B;
+ end if;
+
+ when RENORM_A2 =>
+ -- r.opsel_a = AIN_C for fmul/fmadd, AIN_B for fdiv
+ set_a := '1';
+ v.result_exp := new_exp;
+ if r.insn(4) = '1' then
+ if r.c.mantissa(54) = '1' then
+ if r.insn(3) = '0' or r.b.class = ZERO then
+ v.first := '1';
+ v.state := MULT_1;
+ else
+ v.madd_cmp := '0';
+ if new_exp + 1 >= r.b.exponent then
+ v.madd_cmp := '1';
+ end if;
+ v.opsel_a := AIN_B;
+ v.state := DO_FMADD;
+ end if;
+ else
+ v.state := RENORM_C;
+ end if;
+ else
+ if r.b.mantissa(54) = '1' then
+ v.first := '1';
+ v.state := DIV_2;
+ else
+ v.state := RENORM_B;
+ end if;
+ end if;
+
+ when RENORM_B =>
+ renormalize := '1';
+ renorm_sqrt := r.is_sqrt;
+ v.state := RENORM_B2;
+
+ when RENORM_B2 =>
+ set_b := '1';
+ if r.is_sqrt = '0' then
+ v.result_exp := r.result_exp + r.shift;
+ else
+ v.result_exp := new_exp;
+ end if;
+ v.opsel_a := AIN_B;
+ v.state := LOOKUP;
+
+ when RENORM_C =>
+ renormalize := '1';
+ v.state := RENORM_C2;
+
+ when RENORM_C2 =>
+ set_c := '1';
+ v.result_exp := new_exp;
+ if r.insn(3) = '0' or r.b.class = ZERO then
+ v.first := '1';
+ v.state := MULT_1;
+ else
+ v.madd_cmp := '0';
+ if new_exp + 1 >= r.b.exponent then
+ v.madd_cmp := '1';
+ end if;
+ v.opsel_a := AIN_B;
+ v.state := DO_FMADD;
+ end if;
+
+ when ADD_1 =>
+ -- transferring B to R
+ v.shift := r.b.exponent - r.a.exponent;
+ v.result_exp := r.b.exponent;
+ v.longmask := '0';
+ v.state := ADD_SHIFT;
+
+ when ADD_SHIFT =>
+ -- r.shift = - exponent difference, r.longmask = 0
+ opsel_r <= RES_SHIFT;
+ v.x := s_nz;
+ set_x := '1';
+ v.longmask := r.single_prec;
+ if r.add_bsmall = '1' then
+ v.opsel_a := AIN_A;
+ else
+ v.opsel_a := AIN_B;
+ end if;
+ v.state := ADD_2;
+
+ when ADD_2 =>
+ -- r.opsel_a = AIN_A if r.add_bsmall = 1 else AIN_B
+ opsel_b <= BIN_R;
+ opsel_binv <= r.is_subtract;
+ carry_in <= r.is_subtract and not r.x;
+ v.shift := to_signed(-1, EXP_BITS);
+ v.state := ADD_3;
+
+ when ADD_3 =>
+ -- check for overflow or negative result (can't get both)
+ -- r.shift = -1
+ if r.r(63) = '1' then
+ -- result is opposite sign to expected
+ v.result_sign := not r.result_sign;
+ opsel_ainv <= '1';
+ carry_in <= '1';
+ v.state := FINISH;
+ elsif r.r(55) = '1' then
+ -- sum overflowed, shift right
+ opsel_r <= RES_SHIFT;
+ set_x := '1';
+ if exp_huge = '1' then
+ v.state := ROUND_OFLOW;
+ else
+ v.state := ROUNDING;
+ end if;
+ elsif r.r(54) = '1' then
+ set_x := '1';
+ v.state := ROUNDING;
+ elsif (r_hi_nz or r_lo_nz or r.r(1) or r.r(0)) = '0' then
+ -- r.x must be zero at this point
+ v.result_class := ZERO;
+ if r.is_subtract = '1' then
+ -- set result sign depending on rounding mode
+ v.result_sign := r.round_mode(1) and r.round_mode(0);
+ end if;
+ arith_done := '1';
+ else
+ renormalize := '1';
+ v.state := NORMALIZE;
+ end if;
+
+ when CMP_1 =>
+ -- r.opsel_a = AIN_A
+ opsel_b <= BIN_R;
+ opsel_binv <= '1';
+ carry_in <= '1';
+ v.state := CMP_2;
+
+ when CMP_2 =>
+ if r.r(63) = '1' then
+ -- A is smaller in magnitude
+ v.cr_result := not r.a.negative & r.a.negative & "00";
+ elsif (r_hi_nz or r_lo_nz) = '0' then
+ v.cr_result := "0010";
+ else
+ v.cr_result := r.a.negative & not r.a.negative & "00";
+ end if;
+ v.fpscr(FPSCR_FL downto FPSCR_FU) := v.cr_result;
+ v.instr_done := '1';
+ v.state := IDLE;
+
+ when MULT_1 =>
+ f_to_multiply.valid <= r.first;
+ opsel_r <= RES_MULT;
+ if multiply_to_f.valid = '1' then
+ v.state := FINISH;
+ end if;
+
+ when FMADD_1 =>
+ -- Addend is bigger here
+ v.result_sign := not (r.b.negative xor r.insn(1) xor r.insn(2));
+ -- note v.shift is at most -2 here
+ v.shift := r.result_exp - r.b.exponent;
+ opsel_r <= RES_MULT;
+ opsel_s <= S_MULT;
+ set_s := '1';
+ f_to_multiply.valid <= r.first;
+ if multiply_to_f.valid = '1' then
+ v.longmask := '0';
+ v.state := ADD_SHIFT;
+ end if;
+
+ when FMADD_2 =>
+ -- Product is potentially bigger here
+ -- r.shift = addend exp - product exp + 64, r.r = r.b.mantissa
+ set_s := '1';
+ opsel_s <= S_SHIFT;
+ v.shift := r.shift - to_signed(64, EXP_BITS);
+ v.state := FMADD_3;
+
+ when FMADD_3 =>
+ -- r.shift = addend exp - product exp
+ opsel_r <= RES_SHIFT;
+ v.first := '1';
+ v.state := FMADD_4;
+
+ when FMADD_4 =>
+ msel_add <= MULADD_RS;
+ f_to_multiply.valid <= r.first;
+ msel_inv <= r.is_subtract;
+ opsel_r <= RES_MULT;
+ opsel_s <= S_MULT;
+ set_s := '1';
+ if multiply_to_f.valid = '1' then
+ v.state := FMADD_5;
+ end if;
+
+ when FMADD_5 =>
+ -- negate R:S:X if negative
+ if r.r(63) = '1' then
+ v.result_sign := not r.result_sign;
+ opsel_ainv <= '1';
+ carry_in <= not (s_nz or r.x);
+ opsel_s <= S_NEG;
+ set_s := '1';
+ end if;
+ v.shift := to_signed(56, EXP_BITS);
+ v.state := FMADD_6;
+
+ when FMADD_6 =>
+ -- r.shift = 56 (or 0, but only if r is now nonzero)
+ if (r.r(56) or r_hi_nz or r_lo_nz or r.r(1) or r.r(0)) = '0' then
+ if s_nz = '0' then
+ -- must be a subtraction, and r.x must be zero
+ v.result_class := ZERO;
+ v.result_sign := r.round_mode(1) and r.round_mode(0);
+ arith_done := '1';
+ else
+ -- R is all zeroes but there are non-zero bits in S
+ -- so shift them into R and set S to 0
+ opsel_r <= RES_SHIFT;
+ set_s := '1';
+ -- stay in state FMADD_6
+ end if;
+ elsif r.r(56 downto 54) = "001" then
+ v.state := FINISH;
+ else
+ renormalize := '1';
+ v.state := NORMALIZE;
+ end if;
+
+ when LOOKUP =>
+ -- r.opsel_a = AIN_B
+ -- wait one cycle for inverse_table[B] lookup
+ v.first := '1';
+ if r.insn(4) = '0' then
+ if r.insn(3) = '0' then
+ v.state := DIV_2;
+ else
+ v.state := SQRT_1;
+ end if;
+ elsif r.insn(2) = '0' then
+ v.state := FRE_1;
+ else
+ v.state := RSQRT_1;
+ end if;
+
+ when DIV_2 =>
+ -- compute Y = inverse_table[B] (when count=0); P = 2 - B * Y
+ msel_1 <= MUL1_B;
+ msel_add <= MULADD_CONST;
+ msel_inv <= '1';
+ if r.count = 0 then
+ msel_2 <= MUL2_LUT;
+ else
+ msel_2 <= MUL2_P;
+ end if;
+ set_y := r.first;
+ pshift := '1';
+ f_to_multiply.valid <= r.first;
+ if multiply_to_f.valid = '1' then
+ v.first := '1';
+ v.count := r.count + 1;
+ v.state := DIV_3;
+ end if;
+
+ when DIV_3 =>
+ -- compute Y = P = P * Y
+ msel_1 <= MUL1_Y;
+ msel_2 <= MUL2_P;
+ f_to_multiply.valid <= r.first;
+ pshift := '1';
+ if multiply_to_f.valid = '1' then
+ v.first := '1';
+ if r.count = 3 then
+ v.state := DIV_4;
+ else
+ v.state := DIV_2;
+ end if;
+ end if;
+
+ when DIV_4 =>
+ -- compute R = P = A * Y (quotient)
+ msel_1 <= MUL1_A;
+ msel_2 <= MUL2_P;
+ set_y := r.first;
+ f_to_multiply.valid <= r.first;
+ pshift := '1';
+ if multiply_to_f.valid = '1' then
+ opsel_r <= RES_MULT;
+ v.first := '1';
+ v.state := DIV_5;
+ end if;
+
+ when DIV_5 =>
+ -- compute P = A - B * R (remainder)
+ msel_1 <= MUL1_B;
+ msel_2 <= MUL2_R;
+ msel_add <= MULADD_A;
+ msel_inv <= '1';
+ f_to_multiply.valid <= r.first;
+ if multiply_to_f.valid = '1' then
+ v.state := DIV_6;
+ end if;
+
+ when DIV_6 =>
+ -- test if remainder is 0 or >= B
+ if pcmpb_lt = '1' then
+ -- quotient is correct, set X if remainder non-zero
+ v.x := r.p(58) or px_nz;
+ else
+ -- quotient needs to be incremented by 1
+ carry_in <= '1';
+ v.x := not pcmpb_eq;
+ end if;
+ v.state := FINISH;
+
+ when FRE_1 =>
+ opsel_r <= RES_MISC;
+ misc_sel <= "0111";
+ v.shift := to_signed(1, EXP_BITS);
+ v.state := NORMALIZE;
+
+ when FTDIV_1 =>
+ v.cr_result(1) := exp_tiny or exp_huge;
+ if exp_tiny = '1' or exp_huge = '1' or r.a.class = ZERO or r.first = '0' then
+ v.instr_done := '1';
+ v.state := IDLE;
+ else
+ v.shift := r.a.exponent;
+ v.doing_ftdiv := "10";
+ end if;
+
+ when RSQRT_1 =>
+ opsel_r <= RES_MISC;
+ misc_sel <= "0111";
+ sqrt_exp := r.b.exponent(EXP_BITS-1) & r.b.exponent(EXP_BITS-1 downto 1);
+ v.result_exp := - sqrt_exp;
+ v.shift := to_signed(1, EXP_BITS);
+ v.state := NORMALIZE;
+
+ when SQRT_1 =>
+ -- put invsqr[B] in R and compute P = invsqr[B] * B
+ -- also transfer B (in R) to A
+ set_a := '1';
+ opsel_r <= RES_MISC;
+ misc_sel <= "0111";
+ msel_1 <= MUL1_B;
+ msel_2 <= MUL2_LUT;
+ f_to_multiply.valid <= '1';
+ v.shift := to_signed(-1, EXP_BITS);
+ v.count := "00";
+ v.state := SQRT_2;
+
+ when SQRT_2 =>
+ -- shift R right one place
+ -- not expecting multiplier result yet
+ -- r.shift = -1
+ opsel_r <= RES_SHIFT;
+ v.first := '1';
+ v.state := SQRT_3;
+
+ when SQRT_3 =>
+ -- put R into Y, wait for product from multiplier
+ msel_2 <= MUL2_R;
+ set_y := r.first;
+ pshift := '1';
+ if multiply_to_f.valid = '1' then
+ -- put result into R
+ opsel_r <= RES_MULT;
+ v.first := '1';
+ v.state := SQRT_4;
+ end if;
+
+ when SQRT_4 =>
+ -- compute 1.5 - Y * P
+ msel_1 <= MUL1_Y;
+ msel_2 <= MUL2_P;
+ msel_add <= MULADD_CONST;
+ msel_inv <= '1';
+ f_to_multiply.valid <= r.first;
+ pshift := '1';
+ if multiply_to_f.valid = '1' then
+ v.state := SQRT_5;
+ end if;
+
+ when SQRT_5 =>
+ -- compute Y = Y * P
+ msel_1 <= MUL1_Y;
+ msel_2 <= MUL2_P;
+ f_to_multiply.valid <= '1';
+ v.first := '1';
+ v.state := SQRT_6;
+
+ when SQRT_6 =>
+ -- pipeline in R = R * P
+ msel_1 <= MUL1_R;
+ msel_2 <= MUL2_P;
+ f_to_multiply.valid <= r.first;
+ pshift := '1';
+ if multiply_to_f.valid = '1' then
+ v.first := '1';
+ v.state := SQRT_7;
+ end if;
+
+ when SQRT_7 =>
+ -- first multiply is done, put result in Y
+ msel_2 <= MUL2_P;
+ set_y := r.first;
+ -- wait for second multiply (should be here already)
+ pshift := '1';
+ if multiply_to_f.valid = '1' then
+ -- put result into R
+ opsel_r <= RES_MULT;
+ v.first := '1';
+ v.count := r.count + 1;
+ if r.count < 2 then
+ v.state := SQRT_4;
+ else
+ v.first := '1';
+ v.state := SQRT_8;
+ end if;
+ end if;
+
+ when SQRT_8 =>
+ -- compute P = A - R * R, which can be +ve or -ve
+ -- we arranged for B to be put into A earlier
+ msel_1 <= MUL1_R;
+ msel_2 <= MUL2_R;
+ msel_add <= MULADD_A;
+ msel_inv <= '1';
+ pshift := '1';
+ f_to_multiply.valid <= r.first;
+ if multiply_to_f.valid = '1' then
+ v.first := '1';
+ v.state := SQRT_9;
+ end if;
+
+ when SQRT_9 =>
+ -- compute P = P * Y
+ -- since Y is an estimate of 1/sqrt(B), this makes P an
+ -- estimate of the adjustment needed to R. Since the error
+ -- could be negative and we have an unsigned multiplier, the
+ -- upper bits can be wrong, but it turns out the lowest 8 bits
+ -- are correct and are all we need (given 3 iterations through
+ -- SQRT_4 to SQRT_7).
+ msel_1 <= MUL1_Y;
+ msel_2 <= MUL2_P;
+ pshift := '1';
+ f_to_multiply.valid <= r.first;
+ if multiply_to_f.valid = '1' then
+ v.state := SQRT_10;
+ end if;
+
+ when SQRT_10 =>
+ -- Add the bottom 8 bits of P, sign-extended,
+ -- divided by 4, onto R.
+ -- The division by 4 is because R is 10.54 format
+ -- whereas P is 8.56 format.
+ opsel_b <= BIN_PS6;
+ sqrt_exp := r.b.exponent(EXP_BITS-1) & r.b.exponent(EXP_BITS-1 downto 1);
+ v.result_exp := sqrt_exp;
+ v.shift := to_signed(1, EXP_BITS);
+ v.first := '1';
+ v.state := SQRT_11;
+
+ when SQRT_11 =>
+ -- compute P = A - R * R (remainder)
+ -- also put 2 * R + 1 into B for comparison with P
+ msel_1 <= MUL1_R;
+ msel_2 <= MUL2_R;
+ msel_add <= MULADD_A;
+ msel_inv <= '1';
+ f_to_multiply.valid <= r.first;
+ shiftin := '1';
+ set_b := r.first;
+ if multiply_to_f.valid = '1' then
+ v.state := SQRT_12;
+ end if;
+
+ when SQRT_12 =>
+ -- test if remainder is 0 or >= B = 2*R + 1
+ if pcmpb_lt = '1' then
+ -- square root is correct, set X if remainder non-zero
+ v.x := r.p(58) or px_nz;
+ else
+ -- square root needs to be incremented by 1
+ carry_in <= '1';
+ v.x := not pcmpb_eq;
+ end if;
+ v.state := FINISH;
+
+ when INT_SHIFT =>
+ -- r.shift = b.exponent - 52
+ opsel_r <= RES_SHIFT;
+ set_x := '1';
+ v.state := INT_ROUND;
+ v.shift := to_signed(-2, EXP_BITS);
+
+ when INT_ROUND =>
+ -- r.shift = -2
+ opsel_r <= RES_SHIFT;
+ round := fp_rounding(r.r, r.x, '0', r.round_mode, r.result_sign);
+ v.fpscr(FPSCR_FR downto FPSCR_FI) := round;
+ -- Check for negative values that don't round to 0 for fcti*u*
+ if r.insn(8) = '1' and r.result_sign = '1' and
+ (r_hi_nz or r_lo_nz or v.fpscr(FPSCR_FR)) = '1' then
+ v.state := INT_OFLOW;
+ else
+ v.state := INT_FINAL;
+ end if;
+
+ when INT_ISHIFT =>
+ -- r.shift = b.exponent - 54;
+ opsel_r <= RES_SHIFT;
+ v.state := INT_FINAL;
+
+ when INT_FINAL =>
+ -- Negate if necessary, and increment for rounding if needed
+ opsel_ainv <= r.result_sign;
+ carry_in <= r.fpscr(FPSCR_FR) xor r.result_sign;
+ -- Check for possible overflows
+ case r.insn(9 downto 8) is
+ when "00" => -- fctiw[z]
+ need_check := r.r(31) or (r.r(30) and not r.result_sign);
+ when "01" => -- fctiwu[z]
+ need_check := r.r(31);
+ when "10" => -- fctid[z]
+ need_check := r.r(63) or (r.r(62) and not r.result_sign);
+ when others => -- fctidu[z]
+ need_check := r.r(63);
+ end case;
+ if need_check = '1' then
+ v.state := INT_CHECK;
+ else
+ if r.fpscr(FPSCR_FI) = '1' then
+ v.fpscr(FPSCR_XX) := '1';
+ end if;
+ arith_done := '1';
+ end if;
+
+ when INT_CHECK =>
+ if r.insn(9) = '0' then
+ msb := r.r(31);
+ else
+ msb := r.r(63);
+ end if;
+ misc_sel <= '1' & r.insn(9 downto 8) & r.result_sign;
+ if (r.insn(8) = '0' and msb /= r.result_sign) or
+ (r.insn(8) = '1' and msb /= '1') then
+ opsel_r <= RES_MISC;
+ v.fpscr(FPSCR_VXCVI) := '1';
+ invalid := '1';
+ else
+ if r.fpscr(FPSCR_FI) = '1' then
+ v.fpscr(FPSCR_XX) := '1';
+ end if;
+ end if;
+ arith_done := '1';
+
+ when INT_OFLOW =>
+ opsel_r <= RES_MISC;
+ misc_sel <= '1' & r.insn(9 downto 8) & r.result_sign;
+ if r.b.class = NAN then
+ misc_sel(0) <= '1';
+ end if;
+ v.fpscr(FPSCR_VXCVI) := '1';
+ invalid := '1';
+ arith_done := '1';
+
+ when FRI_1 =>
+ -- r.shift = b.exponent - 52
+ opsel_r <= RES_SHIFT;
+ set_x := '1';
+ v.state := ROUNDING;
+
+ when FINISH =>
+ if r.is_multiply = '1' and px_nz = '1' then
+ v.x := '1';
+ end if;
+ if r.r(63 downto 54) /= "0000000001" then
+ renormalize := '1';
+ v.state := NORMALIZE;
+ else
+ set_x := '1';
+ if exp_tiny = '1' then
+ v.shift := new_exp - min_exp;
+ v.state := ROUND_UFLOW;
+ elsif exp_huge = '1' then
+ v.state := ROUND_OFLOW;
+ else
+ v.state := ROUNDING;
+ end if;
+ end if;
+
+ when NORMALIZE =>
+ -- Shift so we have 9 leading zeroes (we know R is non-zero)
+ -- r.shift = clz(r.r) - 9
+ opsel_r <= RES_SHIFT;
+ set_x := '1';
+ if exp_tiny = '1' then
+ v.shift := new_exp - min_exp;
+ v.state := ROUND_UFLOW;
+ elsif exp_huge = '1' then
+ v.state := ROUND_OFLOW;
+ else
+ v.state := ROUNDING;
+ end if;
+
+ when ROUND_UFLOW =>
+ -- r.shift = - amount by which exponent underflows
+ v.tiny := '1';
+ if r.fpscr(FPSCR_UE) = '0' then
+ -- disabled underflow exception case
+ -- have to denormalize before rounding
+ opsel_r <= RES_SHIFT;
+ set_x := '1';
+ v.state := ROUNDING;
+ else
+ -- enabled underflow exception case
+ -- if denormalized, have to normalize before rounding
+ v.fpscr(FPSCR_UX) := '1';
+ v.result_exp := r.result_exp + bias_exp;
+ if r.r(54) = '0' then
+ renormalize := '1';
+ v.state := NORMALIZE;
+ else
+ v.state := ROUNDING;
+ end if;
+ end if;
+
+ when ROUND_OFLOW =>
+ v.fpscr(FPSCR_OX) := '1';
+ if r.fpscr(FPSCR_OE) = '0' then
+ -- disabled overflow exception
+ -- result depends on rounding mode
+ v.fpscr(FPSCR_XX) := '1';
+ v.fpscr(FPSCR_FI) := '1';
+ if r.round_mode(1 downto 0) = "00" or
+ (r.round_mode(1) = '1' and r.round_mode(0) = r.result_sign) then
+ v.result_class := INFINITY;
+ v.fpscr(FPSCR_FR) := '1';
+ else
+ v.fpscr(FPSCR_FR) := '0';
+ end if;
+ -- construct largest representable number
+ v.result_exp := max_exp;
+ opsel_r <= RES_MISC;
+ misc_sel <= "001" & r.single_prec;
+ arith_done := '1';
+ else
+ -- enabled overflow exception
+ v.result_exp := r.result_exp - bias_exp;
+ v.state := ROUNDING;
+ end if;
+
+ when ROUNDING =>
+ opsel_mask <= '1';
+ round := fp_rounding(r.r, r.x, r.single_prec, r.round_mode, r.result_sign);
+ v.fpscr(FPSCR_FR downto FPSCR_FI) := round;
+ if round(1) = '1' then
+ -- increment the LSB for the precision
+ opsel_b <= BIN_RND;
+ v.shift := to_signed(-1, EXP_BITS);
+ v.state := ROUNDING_2;
+ else
+ if r.r(54) = '0' then
+ -- result after masking could be zero, or could be a
+ -- denormalized result that needs to be renormalized
+ renormalize := '1';
+ v.state := ROUNDING_3;
+ else
+ arith_done := '1';
+ end if;
+ end if;
+ if round(0) = '1' then
+ v.fpscr(FPSCR_XX) := '1';
+ if r.tiny = '1' then
+ v.fpscr(FPSCR_UX) := '1';
+ end if;
+ end if;
+
+ when ROUNDING_2 =>
+ -- Check for overflow during rounding
+ -- r.shift = -1
+ v.x := '0';
+ if r.r(55) = '1' then
+ opsel_r <= RES_SHIFT;
+ if exp_huge = '1' then
+ v.state := ROUND_OFLOW;
+ else
+ arith_done := '1';
+ end if;
+ elsif r.r(54) = '0' then
+ -- Do CLZ so we can renormalize the result
+ renormalize := '1';
+ v.state := ROUNDING_3;
+ else
+ arith_done := '1';
+ end if;
+
+ when ROUNDING_3 =>
+ -- r.shift = clz(r.r) - 9
+ mant_nz := r_hi_nz or (r_lo_nz and not r.single_prec);
+ if mant_nz = '0' then
+ v.result_class := ZERO;
+ if r.is_subtract = '1' then
+ -- set result sign depending on rounding mode
+ v.result_sign := r.round_mode(1) and r.round_mode(0);
+ end if;
+ arith_done := '1';
+ else
+ -- Renormalize result after rounding
+ opsel_r <= RES_SHIFT;
+ v.denorm := exp_tiny;
+ v.shift := new_exp - to_signed(-1022, EXP_BITS);
+ if new_exp < to_signed(-1022, EXP_BITS) then
+ v.state := DENORM;
+ else
+ arith_done := '1';
+ end if;
+ end if;
+
+ when DENORM =>
+ -- r.shift = result_exp - -1022
+ opsel_r <= RES_SHIFT;
+ arith_done := '1';
+
+ when NAN_RESULT =>
+ if (r.use_a = '1' and r.a.class = NAN and r.a.mantissa(53) = '0') or
+ (r.use_b = '1' and r.b.class = NAN and r.b.mantissa(53) = '0') or
+ (r.use_c = '1' and r.c.class = NAN and r.c.mantissa(53) = '0') then
+ -- Signalling NAN
+ v.fpscr(FPSCR_VXSNAN) := '1';
+ invalid := '1';
+ end if;
+ if r.use_a = '1' and r.a.class = NAN then
+ v.opsel_a := AIN_A;
+ elsif r.use_b = '1' and r.b.class = NAN then
+ v.opsel_a := AIN_B;
+ elsif r.use_c = '1' and r.c.class = NAN then
+ v.opsel_a := AIN_C;
+ end if;
+ v.state := EXC_RESULT;
+
+ when EXC_RESULT =>
+ -- r.opsel_a = AIN_A, AIN_B or AIN_C according to which input is the result
+ case r.opsel_a is
+ when AIN_B =>
+ v.result_sign := r.b.negative xor r.negate;
+ v.result_exp := r.b.exponent;
+ v.result_class := r.b.class;
+ when AIN_C =>
+ v.result_sign := r.c.negative xor r.negate;
+ v.result_exp := r.c.exponent;
+ v.result_class := r.c.class;
+ when others =>
+ v.result_sign := r.a.negative xor r.negate;
+ v.result_exp := r.a.exponent;
+ v.result_class := r.a.class;
+ end case;
+ arith_done := '1';
+
+ end case;
+
+ if zero_divide = '1' then
+ v.fpscr(FPSCR_ZX) := '1';
+ end if;
+ if qnan_result = '1' then
+ invalid := '1';
+ v.result_class := NAN;
+ v.result_sign := '0';
+ misc_sel <= "0001";
+ opsel_r <= RES_MISC;
+ arith_done := '1';
+ end if;
+ if invalid = '1' then
+ v.invalid := '1';
+ end if;
+ if arith_done = '1' then
+ -- Enabled invalid exception doesn't write result or FPRF
+ -- Neither does enabled zero-divide exception
+ if (v.invalid and r.fpscr(FPSCR_VE)) = '0' and
+ (zero_divide and r.fpscr(FPSCR_ZE)) = '0' then
+ v.writing_back := '1';
+ v.update_fprf := '1';
+ end if;
+ v.instr_done := '1';
+ v.state := IDLE;
+ update_fx := '1';
+ end if;
+
+ -- Multiplier and divide/square root data path
+ case msel_1 is
+ when MUL1_A =>
+ f_to_multiply.data1 <= r.a.mantissa(61 downto 0) & "00";
+ when MUL1_B =>
+ f_to_multiply.data1 <= r.b.mantissa(61 downto 0) & "00";
+ when MUL1_Y =>
+ f_to_multiply.data1 <= r.y;
+ when others =>
+ f_to_multiply.data1 <= r.r(61 downto 0) & "00";
end case;
+ case msel_2 is
+ when MUL2_C =>
+ f_to_multiply.data2 <= r.c.mantissa(61 downto 0) & "00";
+ when MUL2_LUT =>
+ f_to_multiply.data2 <= x"00" & inverse_est & '0' & x"000000000";
+ when MUL2_P =>
+ f_to_multiply.data2 <= r.p;
+ when others =>
+ f_to_multiply.data2 <= r.r(61 downto 0) & "00";
+ end case;
+ maddend := (others => '0');
+ case msel_add is
+ when MULADD_CONST =>
+ -- addend is 2.0 or 1.5 in 16.112 format
+ if r.is_sqrt = '0' then
+ maddend(113) := '1'; -- 2.0
+ else
+ maddend(112 downto 111) := "11"; -- 1.5
+ end if;
+ when MULADD_A =>
+ -- addend is A in 16.112 format
+ maddend(121 downto 58) := r.a.mantissa;
+ when MULADD_RS =>
+ -- addend is concatenation of R and S in 16.112 format
+ maddend := "000000" & r.r & r.s & "00";
+ when others =>
+ end case;
+ if msel_inv = '1' then
+ f_to_multiply.addend <= not maddend;
+ else
+ f_to_multiply.addend <= maddend;
+ end if;
+ f_to_multiply.not_result <= msel_inv;
+ if set_y = '1' then
+ v.y := f_to_multiply.data2;
+ end if;
+ if multiply_to_f.valid = '1' then
+ if pshift = '0' then
+ v.p := multiply_to_f.result(63 downto 0);
+ else
+ v.p := multiply_to_f.result(119 downto 56);
+ end if;
+ end if;
-- Data path.
+ -- This has A and B input multiplexers, an adder, a shifter,
+ -- count-leading-zeroes logic, and a result mux.
+ if r.longmask = '1' then
+ mshift := r.shift + to_signed(-29, EXP_BITS);
+ else
+ mshift := r.shift;
+ end if;
+ if mshift < to_signed(-64, EXP_BITS) then
+ mask := (others => '1');
+ elsif mshift >= to_signed(0, EXP_BITS) then
+ mask := (others => '0');
+ else
+ mask := right_mask(unsigned(mshift(5 downto 0)));
+ end if;
+ case r.opsel_a is
+ when AIN_R =>
+ in_a0 := r.r;
+ when AIN_A =>
+ in_a0 := r.a.mantissa;
+ when AIN_B =>
+ in_a0 := r.b.mantissa;
+ when others =>
+ in_a0 := r.c.mantissa;
+ end case;
+ if (or (mask and in_a0)) = '1' and set_x = '1' then
+ v.x := '1';
+ end if;
+ if opsel_ainv = '1' then
+ in_a0 := not in_a0;
+ end if;
+ in_a <= in_a0;
+ case opsel_b is
+ when BIN_ZERO =>
+ in_b0 := (others => '0');
+ when BIN_R =>
+ in_b0 := r.r;
+ when BIN_RND =>
+ round_inc := (31 => r.single_prec, 2 => not r.single_prec, others => '0');
+ in_b0 := round_inc;
+ when others =>
+ -- BIN_PS6, 6 LSBs of P/4 sign-extended to 64
+ in_b0 := std_ulogic_vector(resize(signed(r.p(7 downto 2)), 64));
+ end case;
+ if opsel_binv = '1' then
+ in_b0 := not in_b0;
+ end if;
+ in_b <= in_b0;
+ if r.shift >= to_signed(-64, EXP_BITS) and r.shift <= to_signed(63, EXP_BITS) then
+ shift_res := shifter_64(r.r & (shiftin or r.s(55)) & r.s(54 downto 0),
+ std_ulogic_vector(r.shift(6 downto 0)));
+ else
+ shift_res := (others => '0');
+ end if;
+ sum := std_ulogic_vector(unsigned(in_a) + unsigned(in_b) + carry_in);
+ if opsel_mask = '1' then
+ sum(1 downto 0) := "00";
+ if r.single_prec = '1' then
+ sum(30 downto 2) := (others => '0');
+ end if;
+ end if;
case opsel_r is
- when "00" =>
- result <= r.b.mantissa;
- when "10" =>
- result <= x"00000000" & (r.fpscr and fpscr_mask);
+ when RES_SUM =>
+ result <= sum;
+ when RES_SHIFT =>
+ result <= shift_res;
+ when RES_MULT =>
+ result <= multiply_to_f.result(121 downto 58);
when others =>
- result <= (others => '0');
+ case misc_sel is
+ when "0000" =>
+ misc := x"00000000" & (r.fpscr and fpscr_mask);
+ when "0001" =>
+ -- generated QNaN mantissa
+ misc := x"0020000000000000";
+ when "0010" =>
+ -- mantissa of max representable DP number
+ misc := x"007ffffffffffffc";
+ when "0011" =>
+ -- mantissa of max representable SP number
+ misc := x"007fffff80000000";
+ when "0100" =>
+ -- fmrgow result
+ misc := r.a.mantissa(31 downto 0) & r.b.mantissa(31 downto 0);
+ when "0110" =>
+ -- fmrgew result
+ misc := r.a.mantissa(63 downto 32) & r.b.mantissa(63 downto 32);
+ when "0111" =>
+ misc := 10x"000" & inverse_est & 35x"000000000";
+ when "1000" =>
+ -- max positive result for fctiw[z]
+ misc := x"000000007fffffff";
+ when "1001" =>
+ -- max negative result for fctiw[z]
+ misc := x"ffffffff80000000";
+ when "1010" =>
+ -- max positive result for fctiwu[z]
+ misc := x"00000000ffffffff";
+ when "1011" =>
+ -- max negative result for fctiwu[z]
+ misc := x"0000000000000000";
+ when "1100" =>
+ -- max positive result for fctid[z]
+ misc := x"7fffffffffffffff";
+ when "1101" =>
+ -- max negative result for fctid[z]
+ misc := x"8000000000000000";
+ when "1110" =>
+ -- max positive result for fctidu[z]
+ misc := x"ffffffffffffffff";
+ when "1111" =>
+ -- max negative result for fctidu[z]
+ misc := x"0000000000000000";
+ when others =>
+ misc := x"0000000000000000";
+ end case;
+ result <= misc;
end case;
v.r := result;
+ if set_s = '1' then
+ case opsel_s is
+ when S_NEG =>
+ v.s := std_ulogic_vector(unsigned(not r.s) + (not r.x));
+ when S_MULT =>
+ v.s := multiply_to_f.result(57 downto 2);
+ when S_SHIFT =>
+ v.s := shift_res(63 downto 8);
+ if shift_res(7 downto 0) /= x"00" then
+ v.x := '1';
+ end if;
+ when others =>
+ v.s := (others => '0');
+ end case;
+ end if;
+
+ if set_a = '1' then
+ v.a.exponent := new_exp;
+ v.a.mantissa := shift_res;
+ end if;
+ if set_b = '1' then
+ v.b.exponent := new_exp;
+ v.b.mantissa := shift_res;
+ end if;
+ if set_c = '1' then
+ v.c.exponent := new_exp;
+ v.c.mantissa := shift_res;
+ end if;
+
+ if opsel_r = RES_SHIFT then
+ v.result_exp := new_exp;
+ end if;
+
+ if renormalize = '1' then
+ clz := count_left_zeroes(r.r);
+ if renorm_sqrt = '1' then
+ -- make denormalized value end up with even exponent
+ clz(0) := '1';
+ end if;
+ v.shift := resize(signed('0' & clz) - 9, EXP_BITS);
+ end if;
if r.int_result = '1' then
fp_result <= r.r;
else
- fp_result <= pack_dp(r.result_sign, r.result_class, r.result_exp, r.r);
+ fp_result <= pack_dp(r.result_sign, r.result_class, r.result_exp, r.r,
+ r.single_prec, r.quieten_nan);
+ end if;
+ if r.update_fprf = '1' then
+ v.fpscr(FPSCR_C downto FPSCR_FU) := result_flags(r.result_sign, r.result_class,
+ r.r(54) and not r.denorm);
end if;
v.fpscr(FPSCR_VX) := (or (v.fpscr(FPSCR_VXSNAN downto FPSCR_VXVC))) or
(or (v.fpscr(FPSCR_VXSOFT downto FPSCR_VXCVI)));
v.fpscr(FPSCR_FEX) := or (v.fpscr(FPSCR_VX downto FPSCR_XX) and
v.fpscr(FPSCR_VE downto FPSCR_XE));
+ if update_fx = '1' and
+ (v.fpscr(FPSCR_VX downto FPSCR_XX) and not r.old_exc) /= "00000" then
+ v.fpscr(FPSCR_FX) := '1';
+ end if;
if r.rc = '1' then
v.cr_result := v.fpscr(FPSCR_FX downto FPSCR_OX);
end if;
+ v.illegal := illegal;
if illegal = '1' then
v.instr_done := '0';
- v.do_intr := '0';
+ v.do_intr := '1';
v.writing_back := '0';
v.busy := '0';
v.state := IDLE;
end if;
rin <= v;
- e_out.illegal <= illegal;
end process;
end architecture behaviour;