Opcode/Instruction | Op/En | 64/32 bit Mode Support | CPUID Feature Flag | Description |
---|---|---|---|---|

EVEX.LLIG.66.0F3A.W0 57 /r /ib VREDUCESS xmm1 {k1}{z}, xmm2, xmm3/m32{sae}, imm8 | A | V/V | AVX512DQ | Perform a reduction transformation on a scalar single-precision floating-point value in xmm3/m32 by subtracting a number of fraction bits specified by the imm8 field. Also, upper single-precision floating-point values (bits[127:32]) from xmm2 are copied to xmm1[127:32]. Stores the result in xmm1 register. |

Op/En | Tuple Type | Operand 1 | Operand 2 | Operand 3 | Operand 4 |
---|---|---|---|---|---|

A | Tuple1 Scalar | ModRM:reg (w) | EVEX.vvvv (r) | ModRM:r/m (r) | N/A |

Perform a reduction transformation of the binary encoded single-precision floating-point value in the low dword element of the second source operand (the third operand) and store the reduced result in binary floating-point format to the low dword element of the destination operand (the first operand) under the writemask k1. Bits 127:32 of the destination operand are copied from respective dword elements of the first source operand (the second operand).

The reduction transformation subtracts the integer part and the leading M fractional bits from the binary floating-point source value, where M is a unsigned integer specified by imm8[7:4], see Figure 5-28. Specifically, the reduction transformation can be expressed as:

dest = src – (ROUND(2^{M}*src))*2^{-M};

where “Round()” treats “src”, “2^{M}”, and their product as binary floating-point numbers with normalized significand and biased exponents.

The magnitude of the reduced result can be expressed by considering src= 2^{p}*man2,

where ‘man2’ is the normalized significand and ‘p’ is the unbiased exponent

Then if RC = RNE: 0<=|Reduced Result|<=2^{p-M-1}

Then if RC ≠ RNE: 0<=|Reduced Result|<2^{p-M}

This instruction might end up with a precision exception set. However, in case of SPE set (i.e., Suppress Precision Exception, which is imm8[3]=1), no precision exception is reported.

Handling of special case of input values are listed in Table 5-29.

ReduceArgumentSP(SRC[31:0], imm8[7:0]) { // Check for NaN IF (SRC [31:0] = NAN) THEN RETURN (Convert SRC[31:0] to QNaN); FI M := imm8[7:4]; // Number of fraction bits of the normalized significand to be subtracted RC := imm8[1:0];// Round Control for ROUND() operation RC source := imm[2]; SPE := imm[3];// Suppress Precision Exception TMP[31:0] := 2^{-M}*{ROUND(2^{M}*SRC[31:0], SPE, RC_source, RC)}; // ROUND() treats SRC and 2^{M}as standard binary FP values TMP[31:0] := SRC[31:0] – TMP[31:0]; // subtraction under the same RC,SPE controls RETURN TMP[31:0]; // binary encoded FP with biased exponent and normalized significand }

IF k1[0] or *no writemask* THEN DEST[31:0] := ReduceArgumentSP(SRC2[31:0], imm8[7:0]) ELSE IF *merging-masking* ; merging-masking THEN *DEST[31:0] remains unchanged* ELSE ; zeroing-masking THEN DEST[31:0] = 0 FI; FI; DEST[127:32] := SRC1[127:32] DEST[MAXVL-1:128] := 0

VREDUCESS __m128 _mm_mask_reduce_ss( __m128 a, __m128 b, int imm, int sae)

VREDUCESS __m128 _mm_mask_reduce_ss(__m128 s, __mmask16 k, __m128 a, __m128 b, int imm, int sae)

VREDUCESS __m128 _mm_maskz_reduce_ss(__mmask16 k, __m128 a, __m128 b, int imm, int sae)

Invalid, Precision.

If SPE is enabled, precision exception is not reported (regardless of MXCSR exception mask).

See Table 2-47, “Type E3 Class Exception Conditions.”