src/tint/number.cc - tint - Git at Google

 // Copyright 2022 The Tint Authors.
 //
 // Licensed under the Apache License, Version 2.0 (the "License");
 // you may not use this file except in compliance with the License.
 // You may obtain a copy of the License at
 //
 //     http://www.apache.org/licenses/LICENSE-2.0
 //
 // Unless required by applicable law or agreed to in writing, software
 // distributed under the License is distributed on an "AS IS" BASIS,
 // WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
 // See the License for the specific language governing permissions and
 // limitations under the License.

 #include "src/tint/number.h"

 #include <algorithm>
 #include <cmath>
 #include <cstring>
 #include <ostream>

 #include "src/tint/debug.h"
 #include "src/tint/utils/bitcast.h"

 namespace tint {
 namespace {

 constexpr uint16_t kF16Nan = 0x7e00u;
 constexpr uint16_t kF16PosInf = 0x7c00u;
 constexpr uint16_t kF16NegInf = 0xfc00u;

 constexpr uint16_t kF16SignMask = 0x8000u;
 constexpr uint16_t kF16ExponentMask = 0x7c00u;
 constexpr uint16_t kF16MantissaMask = 0x03ffu;

 constexpr uint32_t kF16MantissaBits = 10;
 constexpr uint32_t kF16ExponentBias = 15;

 constexpr uint32_t kF32SignMask = 0x80000000u;
 constexpr uint32_t kF32ExponentMask = 0x7f800000u;
 constexpr uint32_t kF32MantissaMask = 0x007fffffu;

 constexpr uint32_t kF32MantissaBits = 23;
 constexpr uint32_t kF32ExponentBias = 127;

 constexpr uint32_t kMaxF32BiasedExpForF16NormalNumber = 142;
 constexpr uint32_t kMinF32BiasedExpForF16NormalNumber = 113;
 constexpr uint32_t kMaxF32BiasedExpForF16SubnormalNumber = 112;
 constexpr uint32_t kMinF32BiasedExpForF16SubnormalNumber = 103;

 }  // namespace

 std::ostream& operator<<(std::ostream& out, ConversionFailure failure) {
     switch (failure) {
         case ConversionFailure::kExceedsPositiveLimit:
             return out << "value exceeds positive limit for type";
         case ConversionFailure::kExceedsNegativeLimit:
             return out << "value exceeds negative limit for type";
     }
     return out << "<unknown>";
 }

 f16::type f16::Quantize(f16::type value) {
     if (value > kHighestValue) {
         return std::numeric_limits<f16::type>::infinity();
     }
     if (value < kLowestValue) {
         return -std::numeric_limits<f16::type>::infinity();
     }

     // Below value must be within the finite range of a f16.
     // Assert we use binary32 (i.e. float) as underlying type, which has 4 bytes.
     static_assert(std::is_same<f16::type, float>());

     uint32_t u32 = utils::Bitcast<uint32_t>(value);
     if ((u32 & ~kF32SignMask) == 0) {
         return value;  // +/- zero
     }
     if ((u32 & kF32ExponentMask) == kF32ExponentMask) {  // exponent all 1's
         return value;                                    // inf or nan
     }

     // We are now going to quantize a f32 number into subnormal f16 and store the result value back
     // into a f32 variable. Notice that all subnormal f16 values are just normal f32 values. Below
     // will show that we can do this quantization by just masking out 13 or more lowest mantissa
     // bits of the original f32 number.
     //
     // Note:
     // * f32 has 1 sign bit, 8 exponent bits for biased exponent (i.e. unbiased exponent + 127), and
     //   23 mantissa bits. Binary form: s_eeeeeeee_mmmmmmmmmmmmmmmmmmmmmmm
     //
     // * f16 has 1 sign bit, 5 exponent bits for biased exponent (i.e. unbiased exponent + 15), and
     //   10 mantissa bits. Binary form: s_eeeee_mmmmmmmmmm
     //
     // The largest finite f16 number has a biased exponent of 11110 in binary, or 30 decimal, and so
     // an unbiased exponent of 30 - 15 = 15.
     //
     // The smallest finite f16 number has a biased exponent of 00001 in binary, or 1 decimal, and so
     // a unbiased exponent of 1 - 15 = -14.
     //
     // We may follow the argument below:
     // 1. All normal or subnormal f16 values, range from 0x1.p-24 to 0x1.ffcp15, are exactly
     // representable by a normal f32 number.
     //   1.1. We can denote the set of all f32 number that are exact representation of finite f16
     //   values by `R`.
     //   1.2. We can do the quantization by mapping a normal f32 value v (in the f16 finite range)
     //   to a certain f32 number v' in the set R, which is the largest (by the meaning of absolute
     //   value) one among all values in R that are no larger than v.
     //
     // 2. We can decide whether a given normal f32 number v is in the set R, by looking at its
     // mantissa bits and biased exponent `e`. Recall that biased exponent e is unbiased exponent +
     // 127, and in the range of 1 to 254 for normal f32 number.
     //   2.1. If e >= 143, i.e. abs(v) >= 2^16 > f16::kHighestValue = 0x1.ffcp15, v is larger than
     //   any finite f16 value and can not be in set R. 2.2. If 142 >= e >= 113, or
     //   f16::kHighestValue >= abs(v) >= f16::kSmallestValue = 2^-14, v falls in the range of normal
     //   f16 values. In this case, v is in the set R iff the lowest 13 mantissa bits are all 0. (See
     //   below for proof)
     //     2.2.1. If we let v' be v with lowest 13 mantissa bits masked to 0, v' will be in set R
     //     and the largest one in set R that no larger than v. Such v' is the quantized value of v.
     //   2.3. If 112 >= e >= 103, i.e. 2^-14 > abs(v) >= f16::kSmallestSubnormalValue = 2^-24, v
     //   falls in the range of subnormal f16 values. In this case, v is in the set R iff the lowest
     //   126-e mantissa bits are all 0. Notice that 126-e is in range 14 to 23, inclusive. (See
     //   below for proof)
     //     2.3.1. If we let v' be v with lowest 126-e mantissa bits masked to 0, v' will be in set R
     //     and the largest on in set R that no larger than v. Such v' is the quantized value of v.
     //   2.4. If 2^-24 > abs(v) > 0, i.e. 103 > e, v is smaller than any finite f16 value and not
     //   equal to 0.0, thus can not be in set R.
     //   2.5. If abs(v) = 0, v is in set R and is just +-0.0.
     //
     // Proof for 2.2
     // -------------
     // Any normal f16 number, in binary form, s_eeeee_mmmmmmmmmm, has value
     //
     //      (s == 0 ? 1 : -1) * (1 + uint(mmmmm_mmmmm) * (2^-10)) * 2^(uint(eeeee) - 15)
     //
     // in which unit(bbbbb) means interprete binary pattern "bbbbb" as unsigned binary number,
     // and we have 1 <= uint(eeeee) <= 30.
     //
     // This value is equal to a normal f32 number with binary
     //      s_EEEEEEEE_mmmmmmmmmm0000000000000
     //
     // where uint(EEEEEEEE) = uint(eeeee) + 112, so that unbiased exponent is kept unchanged
     //
     //      uint(EEEEEEEE) - 127 = uint(eeeee) - 15
     //
     // and its value is
     //         (s == 0 ? 1 : -1) *
     //            (1 + uint(mmmmm_mmmmm_00000_00000_000) * (2^-23)) * 2^(uint(EEEEEEEE) - 127)
     //      == (s == 0 ? 1 : -1) *
     //            (1 + uint(mmmmm_mmmmm)                 * (2^-10)) * 2^(uint(eeeee) - 15)
     //
     // Notice that uint(EEEEEEEE) is in range [113, 142], showing that it is a normal f32 number.
     // So we proved that any normal f16 number can be exactly representd by a normal f32 number
     // with biased exponent in range [113, 142] and the lowest 13 mantissa bits 0.
     //
     // On the other hand, since mantissa bits mmmmmmmmmm are arbitrary, the value of any f32
     // that has a biased exponent in range [113, 142] and lowest 13 mantissa bits zero is equal
     // to a normal f16 value. Hence we prove 2.2.
     //
     // Proof for 2.3
     // -------------
     // Any subnormal f16 number has a binary form of s_00000_mmmmmmmmmm, and its value is
     //
     //    (s == 0 ? 1 : -1) * uint(mmmmmmmmmm) * (2^-10) * (2^-14)
     // == (s == 0 ? 1 : -1) * uint(mmmmmmmmmm) * (2^-24).
     //
     // We discuss the bit pattern of mantissa bits mmmmmmmmmm.
     //   Case 1: mantissa bits have no leading zero bit, s_00000_1mmmmmmmmm
     //      In this case the value is
     //              (s == 0 ? 1 : -1) *      uint(1mmmm_mmmmm)                 * (2^-10)  * (2^-14)
     //          ==  (s == 0 ? 1 : -1) * (    uint(1_mmmmm_mmmm)                * (2^-9))  * (2^-15)
     //          ==  (s == 0 ? 1 : -1) * (1 + uint(mmmmm_mmmm)                  * (2^-9))  * (2^-15)
     //          ==  (s == 0 ? 1 : -1) * (1 + uint(mmmmm_mmmm0_00000_00000_000) * (2^-23)) * (2^-15)
     //
     //      which is equal to the value of the normal f32 number
     //
     //          s_EEEEEEEE_mmmmm_mmmm0_00000_00000_000
     //
     //      where uint(EEEEEEEE) == -15 + 127 = 112. Hence we proved that any subnormal f16 number
     //      with no leading zero mantissa bit can be exactly represented by a f32 number with
     //      biased exponent 112 and the lowest 14 mantissa bits zero, and the value of any f32
     //      number with biased exponent 112 and the lowest 14 mantissa bits zero is equal to a
     //      subnormal f16 number with no leading zero mantissa bit.
     //
     //   Case 2: mantissa bits has 1 leading zero bit, s_00000_01mmmmmmmm
     //      In this case the value is
     //              (s == 0 ? 1 : -1) *      uint(01mmm_mmmmm)                 * (2^-10)  * (2^-14)
     //          ==  (s == 0 ? 1 : -1) * (    uint(01_mmmmm_mmm)                * (2^-8))  * (2^-16)
     //          ==  (s == 0 ? 1 : -1) * (1 + uint(mmmmm_mmm)                   * (2^-8))  * (2^-16)
     //          ==  (s == 0 ? 1 : -1) * (1 + uint(mmmmm_mmm00_00000_00000_000) * (2^-23)) * (2^-16)
     //
     //      which is equal to the value of normal f32 number
     //
     //          s_EEEEEEEE_mmmmm_mmm00_00000_00000_000
     //
     //      where uint(EEEEEEEE) = -16 + 127 = 111. Hence we proved that any subnormal f16 number
     //      with 1 leading zero mantissa bit can be exactly represented by a f32 number with
     //      biased exponent 111 and the lowest 15 mantissa bits zero, and the value of any f32
     //      number with biased exponent 111 and the lowest 15 mantissa bits zero is equal to a
     //      subnormal f16 number with 1 leading zero mantissa bit.
     //
     //   Case 3 to case 8: ......
     //
     //   Case 9: mantissa bits has 8 leading zero bits, s_00000_000000001m
     //      In this case the value is
     //              (s == 0 ? 1 : -1) *      uint(00000_0001m)                 * (2^-10)  * (2^-14)
     //          ==  (s == 0 ? 1 : -1) * (    uint(000000001_m)                 * (2^-1))  * (2^-23)
     //          ==  (s == 0 ? 1 : -1) * (1 + uint(m)                           * (2^-1))  * (2^-23)
     //          ==  (s == 0 ? 1 : -1) * (1 + uint(m0000_00000_00000_00000_000) * (2^-23)) * (2^-23)
     //
     //      which is equal to the value of normal f32 number
     //
     //          s_EEEEEEEE_m0000_00000_00000_00000_000
     //
     //      where uint(EEEEEEEE) = -23 + 127 = 104. Hence we proved that any subnormal f16 number
     //      with 8 leading zero mantissa bit can be exactly represented by a f32 number with
     //      biased exponent 104 and the lowest 22 mantissa bits zero, and the value of any f32
     //      number with biased exponent 104 and the lowest 22 mantissa bits zero are equal to a
     //      subnormal f16 number with 8 leading zero mantissa bit.
     //
     //   Case 10: mantissa bits has 9 leading zero bits, s_00000_0000000001
     //      In this case the value is just +-2^-24 == +-0x1.0p-24,
     //      the f32 number has biased exponent 103 and all 23 mantissa bits zero.
     //
     //   Case 11: mantissa bits has 10 leading zero bits, s_00000_0000000000, just 0.0
     //
     // Concluding all these case, we proved that any subnormal f16 number with N leading zero
     // mantissa bit can be exactly represented by a f32 number with biased exponent 112 - N and the
     // lowest 14 + N mantissa bits zero, and the value of any f32 number with biased exponent
     // 112 - N (= e) and the lowest 14 + N (= 126 - e) mantissa bits zero are equal to a subnormal
     // f16 number with N leading zero mantissa bits. N is in range [0, 9], so the f32 number's
     // biased exponent e is in range [103, 112], or unbiased exponent in [-24, -15].

     float abs_value = std::fabs(value);
     if (abs_value >= kSmallestValue) {
         // Value falls in the normal f16 range, quantize it to a normal f16 value by masking out
         // lowest 13 mantissa bits.
         u32 = u32 & ~((1u << (kF32MantissaBits - kF16MantissaBits)) - 1);
     } else if (abs_value >= kSmallestSubnormalValue) {
         // Value should be quantized to a subnormal f16 value.

         // Get the biased exponent `e` of f32 value, e.g. value 127 representing exponent 2^0.
         uint32_t biased_exponent_original = (u32 & kF32ExponentMask) >> kF32MantissaBits;
         // Since we ensure that kSmallestValue = 0x1f-14 > abs(value) >= kSmallestSubnormalValue =
         // 0x1f-24, value will have a unbiased exponent in range -24 to -15 (inclusive), and the
         // corresponding biased exponent in f32 is in range 103 to 112 (inclusive).
         TINT_ASSERT(Semantic,
                     (kMinF32BiasedExpForF16SubnormalNumber <= biased_exponent_original) &&
                         (biased_exponent_original <= kMaxF32BiasedExpForF16SubnormalNumber));

         // As we have proved, masking out the lowest 126-e mantissa bits of input value will result
         // in a valid subnormal f16 value, which is exactly the required quantization result.
         uint32_t discard_bits = 126 - biased_exponent_original;  // In range 14 to 23 (inclusive)
         TINT_ASSERT(Semantic, (14 <= discard_bits) && (discard_bits <= kF32MantissaBits));
         uint32_t discard_mask = (1u << discard_bits) - 1;
         u32 = u32 & ~discard_mask;
     } else {
         // value is too small that it can't even be represented as subnormal f16 number. Quantize
         // to zero.
         return value > 0 ? 0.0 : -0.0;
     }

     return utils::Bitcast<f16::type>(u32);
 }

 uint16_t f16::BitsRepresentation() const {
     // Assert we use binary32 (i.e. float) as underlying type, which has 4 bytes.
     static_assert(std::is_same<f16::type, float>());

     // The stored value in f16 object must be already quantized, so it should be either NaN, +/-
     // Inf, or exactly representable by normal or subnormal f16.

     if (std::isnan(value)) {
         return kF16Nan;
     }

     if (std::isinf(value)) {
         return value > 0 ? kF16PosInf : kF16NegInf;
     }

     // Now quantized_value must be a finite f16 exactly-representable value.
     // The following table shows exponent cases for all finite f16 exactly-representable value.
     // ---------------------------------------------------------------------------
     // |  Value category  |  Unbiased exp  |  F16 biased exp  |  F32 biased exp  |
     // |------------------|----------------|------------------|------------------|
     // |     +/- zero     |        \       |         0        |         0        |
     // |  Subnormal f16   |   [-24, -15]   |         0        |    [103, 112]    |
     // |    Normal f16    |   [-14,  15]   |      [1, 30]     |    [113, 142]    |
     // ---------------------------------------------------------------------------

     uint32_t f32_bit_pattern = utils::Bitcast<uint32_t>(value);
     uint32_t f32_biased_exponent = (f32_bit_pattern & kF32ExponentMask) >> kF32MantissaBits;
     uint32_t f32_mantissa = f32_bit_pattern & kF32MantissaMask;

     uint16_t f16_sign_part = static_cast<uint16_t>((f32_bit_pattern & kF32SignMask) >> 16);
     TINT_ASSERT(Semantic, (f16_sign_part & ~kF16SignMask) == 0);

     if ((f32_bit_pattern & ~kF32SignMask) == 0) {
         // +/- zero
         return f16_sign_part;
     }

     if ((kMinF32BiasedExpForF16NormalNumber <= f32_biased_exponent) &&
         (f32_biased_exponent <= kMaxF32BiasedExpForF16NormalNumber)) {
         // Normal f16
         uint32_t f16_biased_exponent = f32_biased_exponent - kF32ExponentBias + kF16ExponentBias;
         uint16_t f16_exp_part = static_cast<uint16_t>(f16_biased_exponent << kF16MantissaBits);
         uint16_t f16_mantissa_part =
             static_cast<uint16_t>(f32_mantissa >> (kF32MantissaBits - kF16MantissaBits));

         TINT_ASSERT(Semantic, (f16_exp_part & ~kF16ExponentMask) == 0);
         TINT_ASSERT(Semantic, (f16_mantissa_part & ~kF16MantissaMask) == 0);

         return f16_sign_part | f16_exp_part | f16_mantissa_part;
     }

     if ((kMinF32BiasedExpForF16SubnormalNumber <= f32_biased_exponent) &&
         (f32_biased_exponent <= kMaxF32BiasedExpForF16SubnormalNumber)) {
         // Subnormal f16
         // The resulting exp bits are always 0, and the mantissa bits should be handled specially.
         uint16_t f16_exp_part = 0;
         // The resulting subnormal f16 will have only 1 valid mantissa bit if the unbiased exponent
         // of value is of the minimum, i.e. -24; and have all 10 mantissa bits valid if the unbiased
         // exponent of value is of the maximum, i.e. -15.
         uint32_t f16_valid_mantissa_bits =
             f32_biased_exponent - kMinF32BiasedExpForF16SubnormalNumber + 1;
         // The resulting f16 mantissa part comes from right-shifting the f32 mantissa bits with
         // leading 1 added.
         uint16_t f16_mantissa_part =
             static_cast<uint16_t>((f32_mantissa | (kF32MantissaMask + 1)) >>
                                   (kF32MantissaBits + 1 - f16_valid_mantissa_bits));

         TINT_ASSERT(Semantic, (1 <= f16_valid_mantissa_bits) &&
                                   (f16_valid_mantissa_bits <= kF16MantissaBits));
         TINT_ASSERT(Semantic, (f16_mantissa_part & ~((1u << f16_valid_mantissa_bits) - 1)) == 0);
         TINT_ASSERT(Semantic, (f16_mantissa_part != 0));

         return f16_sign_part | f16_exp_part | f16_mantissa_part;
     }

     // Neither zero, subnormal f16 or normal f16, shall never hit.
     tint::diag::List diag;
     TINT_UNREACHABLE(Semantic, diag);
     return kF16Nan;
 }

 // static
 Number<detail::NumberKindF16> f16::FromBits(uint16_t bits) {
     // Assert we use binary32 (i.e. float) as underlying type, which has 4 bytes.
     static_assert(std::is_same<f16::type, float>());

     if (bits == kF16PosInf) {
         return f16(std::numeric_limits<f16::type>::infinity());
     }
     if (bits == kF16NegInf) {
         return f16(-std::numeric_limits<f16::type>::infinity());
     }

     auto f16_sign_bit = uint32_t(bits & kF16SignMask);
     // If none of the other bits are set we have a 0. If only the sign bit is set we have a -0.
     if ((bits & ~kF16SignMask) == 0) {
         return f16(f16_sign_bit > 0 ? -0.f : 0.f);
     }

     auto f16_mantissa = uint32_t(bits & kF16MantissaMask);
     auto f16_biased_exponent = uint32_t(bits & kF16ExponentMask);

     // F16 NaN has all expoennt bits set and at least one mantissa bit set
     if (((f16_biased_exponent & kF16ExponentMask) == kF16ExponentMask) && f16_mantissa != 0) {
         return f16(std::numeric_limits<f16::type>::quiet_NaN());
     }

     // Shift the exponent over to be a regular number.
     f16_biased_exponent >>= kF16MantissaBits;

     // Add the F32 bias and remove the F16 bias.
     uint32_t f32_biased_exponent = f16_biased_exponent + kF32ExponentBias - kF16ExponentBias;

     if (f16_biased_exponent == 0) {
         // Subnormal number
         //
         // All subnormal F16 values can be represented as normal F32 values. Shift the mantissa and
         // set the exponent as if this was a normal f16 value.

         // While the first F16 exponent bit is not set
         constexpr uint32_t kF16FirstExponentBit = 0x0400;
         while ((f16_mantissa & kF16FirstExponentBit) == 0) {
             // Shift the mantissa to the left
             f16_mantissa <<= 1;
             // Decrease the biased exponent to counter the shift
             f32_biased_exponent -= 1;
         }

         // Remove the first exponent bit from the mantissa value
         f16_mantissa &= ~kF16FirstExponentBit;
         // Increase the exponent to deal with the masked off value.
         f32_biased_exponent += 1;
     }

     // The mantissa bits are shifted over the difference in mantissa size to be in the F32 location.
     uint32_t f32_mantissa = f16_mantissa << (kF32MantissaBits - kF16MantissaBits);

     // Shift the exponent to the F32 exponent position before the mantissa.
     f32_biased_exponent <<= kF32MantissaBits;

     // Shift the sign bit over to the f32 sign bit position
     uint32_t f32_sign_bit = f16_sign_bit << 16;

     // Combine values together into the F32 value as a uint32_t.
     uint32_t val = f32_sign_bit | f32_biased_exponent | f32_mantissa;

     // Bitcast to a F32 and then store into the F16 Number
     return f16(utils::Bitcast<f16::type>(val));
 }

 }  // namespace tint
	// Copyright 2022 The Tint Authors.
	//
	// Licensed under the Apache License, Version 2.0 (the "License");
	// you may not use this file except in compliance with the License.
	// You may obtain a copy of the License at
	//
	// http://www.apache.org/licenses/LICENSE-2.0
	//
	// Unless required by applicable law or agreed to in writing, software
	// distributed under the License is distributed on an "AS IS" BASIS,
	// WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
	// See the License for the specific language governing permissions and
	// limitations under the License.

	#include "src/tint/number.h"

	#include <algorithm>
	#include <cmath>
	#include <cstring>
	#include <ostream>

	#include "src/tint/debug.h"
	#include "src/tint/utils/bitcast.h"

	namespace tint {
	namespace {

	constexpr uint16_t kF16Nan = 0x7e00u;
	constexpr uint16_t kF16PosInf = 0x7c00u;
	constexpr uint16_t kF16NegInf = 0xfc00u;

	constexpr uint16_t kF16SignMask = 0x8000u;
	constexpr uint16_t kF16ExponentMask = 0x7c00u;
	constexpr uint16_t kF16MantissaMask = 0x03ffu;

	constexpr uint32_t kF16MantissaBits = 10;
	constexpr uint32_t kF16ExponentBias = 15;

	constexpr uint32_t kF32SignMask = 0x80000000u;
	constexpr uint32_t kF32ExponentMask = 0x7f800000u;
	constexpr uint32_t kF32MantissaMask = 0x007fffffu;

	constexpr uint32_t kF32MantissaBits = 23;
	constexpr uint32_t kF32ExponentBias = 127;

	constexpr uint32_t kMaxF32BiasedExpForF16NormalNumber = 142;
	constexpr uint32_t kMinF32BiasedExpForF16NormalNumber = 113;
	constexpr uint32_t kMaxF32BiasedExpForF16SubnormalNumber = 112;
	constexpr uint32_t kMinF32BiasedExpForF16SubnormalNumber = 103;

	} // namespace

	std::ostream& operator<<(std::ostream& out, ConversionFailure failure) {
	switch (failure) {
	case ConversionFailure::kExceedsPositiveLimit:
	return out << "value exceeds positive limit for type";
	case ConversionFailure::kExceedsNegativeLimit:
	return out << "value exceeds negative limit for type";
	}
	return out << "<unknown>";
	}

	f16::type f16::Quantize(f16::type value) {
	if (value > kHighestValue) {
	return std::numeric_limits<f16::type>::infinity();
	}
	if (value < kLowestValue) {
	return -std::numeric_limits<f16::type>::infinity();
	}

	// Below value must be within the finite range of a f16.
	// Assert we use binary32 (i.e. float) as underlying type, which has 4 bytes.
	static_assert(std::is_same<f16::type, float>());

	uint32_t u32 = utils::Bitcast<uint32_t>(value);
	if ((u32 & ~kF32SignMask) == 0) {
	return value; // +/- zero
	}
	if ((u32 & kF32ExponentMask) == kF32ExponentMask) { // exponent all 1's
	return value; // inf or nan
	}

	// We are now going to quantize a f32 number into subnormal f16 and store the result value back
	// into a f32 variable. Notice that all subnormal f16 values are just normal f32 values. Below
	// will show that we can do this quantization by just masking out 13 or more lowest mantissa
	// bits of the original f32 number.
	//
	// Note:
	// * f32 has 1 sign bit, 8 exponent bits for biased exponent (i.e. unbiased exponent + 127), and
	// 23 mantissa bits. Binary form: s_eeeeeeee_mmmmmmmmmmmmmmmmmmmmmmm
	//
	// * f16 has 1 sign bit, 5 exponent bits for biased exponent (i.e. unbiased exponent + 15), and
	// 10 mantissa bits. Binary form: s_eeeee_mmmmmmmmmm
	//
	// The largest finite f16 number has a biased exponent of 11110 in binary, or 30 decimal, and so
	// an unbiased exponent of 30 - 15 = 15.
	//
	// The smallest finite f16 number has a biased exponent of 00001 in binary, or 1 decimal, and so
	// a unbiased exponent of 1 - 15 = -14.
	//
	// We may follow the argument below:
	// 1. All normal or subnormal f16 values, range from 0x1.p-24 to 0x1.ffcp15, are exactly
	// representable by a normal f32 number.
	// 1.1. We can denote the set of all f32 number that are exact representation of finite f16
	// values by `R`.
	// 1.2. We can do the quantization by mapping a normal f32 value v (in the f16 finite range)
	// to a certain f32 number v' in the set R, which is the largest (by the meaning of absolute
	// value) one among all values in R that are no larger than v.
	//
	// 2. We can decide whether a given normal f32 number v is in the set R, by looking at its
	// mantissa bits and biased exponent `e`. Recall that biased exponent e is unbiased exponent +
	// 127, and in the range of 1 to 254 for normal f32 number.
	// 2.1. If e >= 143, i.e. abs(v) >= 2^16 > f16::kHighestValue = 0x1.ffcp15, v is larger than
	// any finite f16 value and can not be in set R. 2.2. If 142 >= e >= 113, or
	// f16::kHighestValue >= abs(v) >= f16::kSmallestValue = 2^-14, v falls in the range of normal
	// f16 values. In this case, v is in the set R iff the lowest 13 mantissa bits are all 0. (See
	// below for proof)
	// 2.2.1. If we let v' be v with lowest 13 mantissa bits masked to 0, v' will be in set R
	// and the largest one in set R that no larger than v. Such v' is the quantized value of v.
	// 2.3. If 112 >= e >= 103, i.e. 2^-14 > abs(v) >= f16::kSmallestSubnormalValue = 2^-24, v
	// falls in the range of subnormal f16 values. In this case, v is in the set R iff the lowest
	// 126-e mantissa bits are all 0. Notice that 126-e is in range 14 to 23, inclusive. (See
	// below for proof)
	// 2.3.1. If we let v' be v with lowest 126-e mantissa bits masked to 0, v' will be in set R
	// and the largest on in set R that no larger than v. Such v' is the quantized value of v.
	// 2.4. If 2^-24 > abs(v) > 0, i.e. 103 > e, v is smaller than any finite f16 value and not
	// equal to 0.0, thus can not be in set R.
	// 2.5. If abs(v) = 0, v is in set R and is just +-0.0.
	//
	// Proof for 2.2
	// -------------
	// Any normal f16 number, in binary form, s_eeeee_mmmmmmmmmm, has value
	//
	// (s == 0 ? 1 : -1) * (1 + uint(mmmmm_mmmmm) * (2^-10)) * 2^(uint(eeeee) - 15)
	//
	// in which unit(bbbbb) means interprete binary pattern "bbbbb" as unsigned binary number,
	// and we have 1 <= uint(eeeee) <= 30.
	//
	// This value is equal to a normal f32 number with binary
	// s_EEEEEEEE_mmmmmmmmmm0000000000000
	//
	// where uint(EEEEEEEE) = uint(eeeee) + 112, so that unbiased exponent is kept unchanged
	//
	// uint(EEEEEEEE) - 127 = uint(eeeee) - 15
	//
	// and its value is
	// (s == 0 ? 1 : -1) *
	// (1 + uint(mmmmm_mmmmm_00000_00000_000) * (2^-23)) * 2^(uint(EEEEEEEE) - 127)
	// == (s == 0 ? 1 : -1) *
	// (1 + uint(mmmmm_mmmmm) * (2^-10)) * 2^(uint(eeeee) - 15)
	//
	// Notice that uint(EEEEEEEE) is in range [113, 142], showing that it is a normal f32 number.
	// So we proved that any normal f16 number can be exactly representd by a normal f32 number
	// with biased exponent in range [113, 142] and the lowest 13 mantissa bits 0.
	//
	// On the other hand, since mantissa bits mmmmmmmmmm are arbitrary, the value of any f32
	// that has a biased exponent in range [113, 142] and lowest 13 mantissa bits zero is equal
	// to a normal f16 value. Hence we prove 2.2.
	//
	// Proof for 2.3
	// -------------
	// Any subnormal f16 number has a binary form of s_00000_mmmmmmmmmm, and its value is
	//
	// (s == 0 ? 1 : -1) * uint(mmmmmmmmmm) * (2^-10) * (2^-14)
	// == (s == 0 ? 1 : -1) * uint(mmmmmmmmmm) * (2^-24).
	//
	// We discuss the bit pattern of mantissa bits mmmmmmmmmm.
	// Case 1: mantissa bits have no leading zero bit, s_00000_1mmmmmmmmm
	// In this case the value is
	// (s == 0 ? 1 : -1) * uint(1mmmm_mmmmm) * (2^-10) * (2^-14)
	// == (s == 0 ? 1 : -1) * ( uint(1_mmmmm_mmmm) * (2^-9)) * (2^-15)
	// == (s == 0 ? 1 : -1) * (1 + uint(mmmmm_mmmm) * (2^-9)) * (2^-15)
	// == (s == 0 ? 1 : -1) * (1 + uint(mmmmm_mmmm0_00000_00000_000) * (2^-23)) * (2^-15)
	//
	// which is equal to the value of the normal f32 number
	//
	// s_EEEEEEEE_mmmmm_mmmm0_00000_00000_000
	//
	// where uint(EEEEEEEE) == -15 + 127 = 112. Hence we proved that any subnormal f16 number
	// with no leading zero mantissa bit can be exactly represented by a f32 number with
	// biased exponent 112 and the lowest 14 mantissa bits zero, and the value of any f32
	// number with biased exponent 112 and the lowest 14 mantissa bits zero is equal to a
	// subnormal f16 number with no leading zero mantissa bit.
	//
	// Case 2: mantissa bits has 1 leading zero bit, s_00000_01mmmmmmmm
	// In this case the value is
	// (s == 0 ? 1 : -1) * uint(01mmm_mmmmm) * (2^-10) * (2^-14)
	// == (s == 0 ? 1 : -1) * ( uint(01_mmmmm_mmm) * (2^-8)) * (2^-16)
	// == (s == 0 ? 1 : -1) * (1 + uint(mmmmm_mmm) * (2^-8)) * (2^-16)
	// == (s == 0 ? 1 : -1) * (1 + uint(mmmmm_mmm00_00000_00000_000) * (2^-23)) * (2^-16)
	//
	// which is equal to the value of normal f32 number
	//
	// s_EEEEEEEE_mmmmm_mmm00_00000_00000_000
	//
	// where uint(EEEEEEEE) = -16 + 127 = 111. Hence we proved that any subnormal f16 number
	// with 1 leading zero mantissa bit can be exactly represented by a f32 number with
	// biased exponent 111 and the lowest 15 mantissa bits zero, and the value of any f32
	// number with biased exponent 111 and the lowest 15 mantissa bits zero is equal to a
	// subnormal f16 number with 1 leading zero mantissa bit.
	//
	// Case 3 to case 8: ......
	//
	// Case 9: mantissa bits has 8 leading zero bits, s_00000_000000001m
	// In this case the value is
	// (s == 0 ? 1 : -1) * uint(00000_0001m) * (2^-10) * (2^-14)
	// == (s == 0 ? 1 : -1) * ( uint(000000001_m) * (2^-1)) * (2^-23)
	// == (s == 0 ? 1 : -1) * (1 + uint(m) * (2^-1)) * (2^-23)
	// == (s == 0 ? 1 : -1) * (1 + uint(m0000_00000_00000_00000_000) * (2^-23)) * (2^-23)
	//
	// which is equal to the value of normal f32 number
	//
	// s_EEEEEEEE_m0000_00000_00000_00000_000
	//
	// where uint(EEEEEEEE) = -23 + 127 = 104. Hence we proved that any subnormal f16 number
	// with 8 leading zero mantissa bit can be exactly represented by a f32 number with
	// biased exponent 104 and the lowest 22 mantissa bits zero, and the value of any f32
	// number with biased exponent 104 and the lowest 22 mantissa bits zero are equal to a
	// subnormal f16 number with 8 leading zero mantissa bit.
	//
	// Case 10: mantissa bits has 9 leading zero bits, s_00000_0000000001
	// In this case the value is just +-2^-24 == +-0x1.0p-24,
	// the f32 number has biased exponent 103 and all 23 mantissa bits zero.
	//
	// Case 11: mantissa bits has 10 leading zero bits, s_00000_0000000000, just 0.0
	//
	// Concluding all these case, we proved that any subnormal f16 number with N leading zero
	// mantissa bit can be exactly represented by a f32 number with biased exponent 112 - N and the
	// lowest 14 + N mantissa bits zero, and the value of any f32 number with biased exponent
	// 112 - N (= e) and the lowest 14 + N (= 126 - e) mantissa bits zero are equal to a subnormal
	// f16 number with N leading zero mantissa bits. N is in range [0, 9], so the f32 number's
	// biased exponent e is in range [103, 112], or unbiased exponent in [-24, -15].

	float abs_value = std::fabs(value);
	if (abs_value >= kSmallestValue) {
	// Value falls in the normal f16 range, quantize it to a normal f16 value by masking out
	// lowest 13 mantissa bits.
	u32 = u32 & ~((1u << (kF32MantissaBits - kF16MantissaBits)) - 1);
	} else if (abs_value >= kSmallestSubnormalValue) {
	// Value should be quantized to a subnormal f16 value.

	// Get the biased exponent `e` of f32 value, e.g. value 127 representing exponent 2^0.
	uint32_t biased_exponent_original = (u32 & kF32ExponentMask) >> kF32MantissaBits;
	// Since we ensure that kSmallestValue = 0x1f-14 > abs(value) >= kSmallestSubnormalValue =
	// 0x1f-24, value will have a unbiased exponent in range -24 to -15 (inclusive), and the
	// corresponding biased exponent in f32 is in range 103 to 112 (inclusive).
	TINT_ASSERT(Semantic,
	(kMinF32BiasedExpForF16SubnormalNumber <= biased_exponent_original) &&
	(biased_exponent_original <= kMaxF32BiasedExpForF16SubnormalNumber));

	// As we have proved, masking out the lowest 126-e mantissa bits of input value will result
	// in a valid subnormal f16 value, which is exactly the required quantization result.
	uint32_t discard_bits = 126 - biased_exponent_original; // In range 14 to 23 (inclusive)
	TINT_ASSERT(Semantic, (14 <= discard_bits) && (discard_bits <= kF32MantissaBits));
	uint32_t discard_mask = (1u << discard_bits) - 1;
	u32 = u32 & ~discard_mask;
	} else {
	// value is too small that it can't even be represented as subnormal f16 number. Quantize
	// to zero.
	return value > 0 ? 0.0 : -0.0;
	}

	return utils::Bitcast<f16::type>(u32);
	}

	uint16_t f16::BitsRepresentation() const {
	// Assert we use binary32 (i.e. float) as underlying type, which has 4 bytes.
	static_assert(std::is_same<f16::type, float>());

	// The stored value in f16 object must be already quantized, so it should be either NaN, +/-
	// Inf, or exactly representable by normal or subnormal f16.

	if (std::isnan(value)) {
	return kF16Nan;
	}

	if (std::isinf(value)) {
	return value > 0 ? kF16PosInf : kF16NegInf;
	}

	// Now quantized_value must be a finite f16 exactly-representable value.
	// The following table shows exponent cases for all finite f16 exactly-representable value.
	// ---------------------------------------------------------------------------
	// \| Value category \| Unbiased exp \| F16 biased exp \| F32 biased exp \|
	// \|------------------\|----------------\|------------------\|------------------\|
	// \| +/- zero \| \ \| 0 \| 0 \|
	// \| Subnormal f16 \| [-24, -15] \| 0 \| [103, 112] \|
	// \| Normal f16 \| [-14, 15] \| [1, 30] \| [113, 142] \|
	// ---------------------------------------------------------------------------

	uint32_t f32_bit_pattern = utils::Bitcast<uint32_t>(value);
	uint32_t f32_biased_exponent = (f32_bit_pattern & kF32ExponentMask) >> kF32MantissaBits;
	uint32_t f32_mantissa = f32_bit_pattern & kF32MantissaMask;

	uint16_t f16_sign_part = static_cast<uint16_t>((f32_bit_pattern & kF32SignMask) >> 16);
	TINT_ASSERT(Semantic, (f16_sign_part & ~kF16SignMask) == 0);

	if ((f32_bit_pattern & ~kF32SignMask) == 0) {
	// +/- zero
	return f16_sign_part;
	}

	if ((kMinF32BiasedExpForF16NormalNumber <= f32_biased_exponent) &&
	(f32_biased_exponent <= kMaxF32BiasedExpForF16NormalNumber)) {
	// Normal f16
	uint32_t f16_biased_exponent = f32_biased_exponent - kF32ExponentBias + kF16ExponentBias;
	uint16_t f16_exp_part = static_cast<uint16_t>(f16_biased_exponent << kF16MantissaBits);
	uint16_t f16_mantissa_part =
	static_cast<uint16_t>(f32_mantissa >> (kF32MantissaBits - kF16MantissaBits));

	TINT_ASSERT(Semantic, (f16_exp_part & ~kF16ExponentMask) == 0);
	TINT_ASSERT(Semantic, (f16_mantissa_part & ~kF16MantissaMask) == 0);

	return f16_sign_part \| f16_exp_part \| f16_mantissa_part;
	}

	if ((kMinF32BiasedExpForF16SubnormalNumber <= f32_biased_exponent) &&
	(f32_biased_exponent <= kMaxF32BiasedExpForF16SubnormalNumber)) {
	// Subnormal f16
	// The resulting exp bits are always 0, and the mantissa bits should be handled specially.
	uint16_t f16_exp_part = 0;
	// The resulting subnormal f16 will have only 1 valid mantissa bit if the unbiased exponent
	// of value is of the minimum, i.e. -24; and have all 10 mantissa bits valid if the unbiased
	// exponent of value is of the maximum, i.e. -15.
	uint32_t f16_valid_mantissa_bits =
	f32_biased_exponent - kMinF32BiasedExpForF16SubnormalNumber + 1;
	// The resulting f16 mantissa part comes from right-shifting the f32 mantissa bits with
	// leading 1 added.
	uint16_t f16_mantissa_part =
	static_cast<uint16_t>((f32_mantissa \| (kF32MantissaMask + 1)) >>
	(kF32MantissaBits + 1 - f16_valid_mantissa_bits));

	TINT_ASSERT(Semantic, (1 <= f16_valid_mantissa_bits) &&
	(f16_valid_mantissa_bits <= kF16MantissaBits));
	TINT_ASSERT(Semantic, (f16_mantissa_part & ~((1u << f16_valid_mantissa_bits) - 1)) == 0);
	TINT_ASSERT(Semantic, (f16_mantissa_part != 0));

	return f16_sign_part \| f16_exp_part \| f16_mantissa_part;
	}

	// Neither zero, subnormal f16 or normal f16, shall never hit.
	tint::diag::List diag;
	TINT_UNREACHABLE(Semantic, diag);
	return kF16Nan;
	}

	// static
	Number<detail::NumberKindF16> f16::FromBits(uint16_t bits) {
	// Assert we use binary32 (i.e. float) as underlying type, which has 4 bytes.
	static_assert(std::is_same<f16::type, float>());

	if (bits == kF16PosInf) {
	return f16(std::numeric_limits<f16::type>::infinity());
	}
	if (bits == kF16NegInf) {
	return f16(-std::numeric_limits<f16::type>::infinity());
	}

	auto f16_sign_bit = uint32_t(bits & kF16SignMask);
	// If none of the other bits are set we have a 0. If only the sign bit is set we have a -0.
	if ((bits & ~kF16SignMask) == 0) {
	return f16(f16_sign_bit > 0 ? -0.f : 0.f);
	}

	auto f16_mantissa = uint32_t(bits & kF16MantissaMask);
	auto f16_biased_exponent = uint32_t(bits & kF16ExponentMask);

	// F16 NaN has all expoennt bits set and at least one mantissa bit set
	if (((f16_biased_exponent & kF16ExponentMask) == kF16ExponentMask) && f16_mantissa != 0) {
	return f16(std::numeric_limits<f16::type>::quiet_NaN());
	}

	// Shift the exponent over to be a regular number.
	f16_biased_exponent >>= kF16MantissaBits;

	// Add the F32 bias and remove the F16 bias.
	uint32_t f32_biased_exponent = f16_biased_exponent + kF32ExponentBias - kF16ExponentBias;

	if (f16_biased_exponent == 0) {
	// Subnormal number
	//
	// All subnormal F16 values can be represented as normal F32 values. Shift the mantissa and
	// set the exponent as if this was a normal f16 value.

	// While the first F16 exponent bit is not set
	constexpr uint32_t kF16FirstExponentBit = 0x0400;
	while ((f16_mantissa & kF16FirstExponentBit) == 0) {
	// Shift the mantissa to the left
	f16_mantissa <<= 1;
	// Decrease the biased exponent to counter the shift
	f32_biased_exponent -= 1;
	}

	// Remove the first exponent bit from the mantissa value
	f16_mantissa &= ~kF16FirstExponentBit;
	// Increase the exponent to deal with the masked off value.
	f32_biased_exponent += 1;
	}

	// The mantissa bits are shifted over the difference in mantissa size to be in the F32 location.
	uint32_t f32_mantissa = f16_mantissa << (kF32MantissaBits - kF16MantissaBits);

	// Shift the exponent to the F32 exponent position before the mantissa.
	f32_biased_exponent <<= kF32MantissaBits;

	// Shift the sign bit over to the f32 sign bit position
	uint32_t f32_sign_bit = f16_sign_bit << 16;

	// Combine values together into the F32 value as a uint32_t.
	uint32_t val = f32_sign_bit \| f32_biased_exponent \| f32_mantissa;

	// Bitcast to a F32 and then store into the F16 Number
	return f16(utils::Bitcast<f16::type>(val));
	}

	} // namespace tint