lib/builtins/divtf3.c - native_client/pnacl-compiler-rt - Git at Google

 //===-- lib/divtf3.c - Quad-precision division --------------------*- C -*-===//
 //
 //                     The LLVM Compiler Infrastructure
 //
 // This file is dual licensed under the MIT and the University of Illinois Open
 // Source Licenses. See LICENSE.TXT for details.
 //
 //===----------------------------------------------------------------------===//
 //
 // This file implements quad-precision soft-float division
 // with the IEEE-754 default rounding (to nearest, ties to even).
 //
 // For simplicity, this implementation currently flushes denormals to zero.
 // It should be a fairly straightforward exercise to implement gradual
 // underflow with correct rounding.
 //
 //===----------------------------------------------------------------------===//

 #define QUAD_PRECISION
 #include "fp_lib.h"

 #if defined(CRT_HAS_128BIT) && defined(CRT_LDBL_128BIT)
 COMPILER_RT_ABI fp_t __divtf3(fp_t a, fp_t b) {

     const unsigned int aExponent = toRep(a) >> significandBits & maxExponent;
     const unsigned int bExponent = toRep(b) >> significandBits & maxExponent;
     const rep_t quotientSign = (toRep(a) ^ toRep(b)) & signBit;

     rep_t aSignificand = toRep(a) & significandMask;
     rep_t bSignificand = toRep(b) & significandMask;
     int scale = 0;

     // Detect if a or b is zero, denormal, infinity, or NaN.
     if (aExponent-1U >= maxExponent-1U || bExponent-1U >= maxExponent-1U) {

         const rep_t aAbs = toRep(a) & absMask;
         const rep_t bAbs = toRep(b) & absMask;

         // NaN / anything = qNaN
         if (aAbs > infRep) return fromRep(toRep(a) | quietBit);
         // anything / NaN = qNaN
         if (bAbs > infRep) return fromRep(toRep(b) | quietBit);

         if (aAbs == infRep) {
             // infinity / infinity = NaN
             if (bAbs == infRep) return fromRep(qnanRep);
             // infinity / anything else = +/- infinity
             else return fromRep(aAbs | quotientSign);
         }

         // anything else / infinity = +/- 0
         if (bAbs == infRep) return fromRep(quotientSign);

         if (!aAbs) {
             // zero / zero = NaN
             if (!bAbs) return fromRep(qnanRep);
             // zero / anything else = +/- zero
             else return fromRep(quotientSign);
         }
         // anything else / zero = +/- infinity
         if (!bAbs) return fromRep(infRep | quotientSign);

         // one or both of a or b is denormal, the other (if applicable) is a
         // normal number.  Renormalize one or both of a and b, and set scale to
         // include the necessary exponent adjustment.
         if (aAbs < implicitBit) scale += normalize(&aSignificand);
         if (bAbs < implicitBit) scale -= normalize(&bSignificand);
     }

     // Or in the implicit significand bit.  (If we fell through from the
     // denormal path it was already set by normalize( ), but setting it twice
     // won't hurt anything.)
     aSignificand |= implicitBit;
     bSignificand |= implicitBit;
     int quotientExponent = aExponent - bExponent + scale;

     // Align the significand of b as a Q63 fixed-point number in the range
     // [1, 2.0) and get a Q64 approximate reciprocal using a small minimax
     // polynomial approximation: reciprocal = 3/4 + 1/sqrt(2) - b/2.  This
     // is accurate to about 3.5 binary digits.
     const uint64_t q63b = bSignificand >> 49;
     uint64_t recip64 = UINT64_C(0x7504f333F9DE6484) - q63b;
     // 0x7504f333F9DE6484 / 2^64 + 1 = 3/4 + 1/sqrt(2)

     // Now refine the reciprocal estimate using a Newton-Raphson iteration:
     //
     //     x1 = x0 * (2 - x0 * b)
     //
     // This doubles the number of correct binary digits in the approximation
     // with each iteration.
     uint64_t correction64;
     correction64 = -((rep_t)recip64 * q63b >> 64);
     recip64 = (rep_t)recip64 * correction64 >> 63;
     correction64 = -((rep_t)recip64 * q63b >> 64);
     recip64 = (rep_t)recip64 * correction64 >> 63;
     correction64 = -((rep_t)recip64 * q63b >> 64);
     recip64 = (rep_t)recip64 * correction64 >> 63;
     correction64 = -((rep_t)recip64 * q63b >> 64);
     recip64 = (rep_t)recip64 * correction64 >> 63;
     correction64 = -((rep_t)recip64 * q63b >> 64);
     recip64 = (rep_t)recip64 * correction64 >> 63;

     // recip64 might have overflowed to exactly zero in the preceeding
     // computation if the high word of b is exactly 1.0.  This would sabotage
     // the full-width final stage of the computation that follows, so we adjust
     // recip64 downward by one bit.
     recip64--;

     // We need to perform one more iteration to get us to 112 binary digits;
     // The last iteration needs to happen with extra precision.
     const uint64_t q127blo = bSignificand << 15;
     rep_t correction, reciprocal;

     // NOTE: This operation is equivalent to __multi3, which is not implemented
     //       in some architechure
     rep_t r64q63, r64q127, r64cH, r64cL, dummy;
     wideMultiply((rep_t)recip64, (rep_t)q63b, &dummy, &r64q63);
     wideMultiply((rep_t)recip64, (rep_t)q127blo, &dummy, &r64q127);

     correction = -(r64q63 + (r64q127 >> 64));

     uint64_t cHi = correction >> 64;
     uint64_t cLo = correction;

     wideMultiply((rep_t)recip64, (rep_t)cHi, &dummy, &r64cH);
     wideMultiply((rep_t)recip64, (rep_t)cLo, &dummy, &r64cL);

     reciprocal = r64cH + (r64cL >> 64);

     // We already adjusted the 64-bit estimate, now we need to adjust the final
     // 128-bit reciprocal estimate downward to ensure that it is strictly smaller
     // than the infinitely precise exact reciprocal.  Because the computation
     // of the Newton-Raphson step is truncating at every step, this adjustment
     // is small; most of the work is already done.
     reciprocal -= 2;

     // The numerical reciprocal is accurate to within 2^-112, lies in the
     // interval [0.5, 1.0), and is strictly smaller than the true reciprocal
     // of b.  Multiplying a by this reciprocal thus gives a numerical q = a/b
     // in Q127 with the following properties:
     //
     //    1. q < a/b
     //    2. q is in the interval [0.5, 2.0)
     //    3. the error in q is bounded away from 2^-113 (actually, we have a
     //       couple of bits to spare, but this is all we need).

     // We need a 128 x 128 multiply high to compute q, which isn't a basic
     // operation in C, so we need to be a little bit fussy.
     rep_t quotient, quotientLo;
     wideMultiply(aSignificand << 2, reciprocal, &quotient, &quotientLo);

     // Two cases: quotient is in [0.5, 1.0) or quotient is in [1.0, 2.0).
     // In either case, we are going to compute a residual of the form
     //
     //     r = a - q*b
     //
     // We know from the construction of q that r satisfies:
     //
     //     0 <= r < ulp(q)*b
     //
     // if r is greater than 1/2 ulp(q)*b, then q rounds up.  Otherwise, we
     // already have the correct result.  The exact halfway case cannot occur.
     // We also take this time to right shift quotient if it falls in the [1,2)
     // range and adjust the exponent accordingly.
     rep_t residual;
     rep_t qb;

     if (quotient < (implicitBit << 1)) {
         wideMultiply(quotient, bSignificand, &dummy, &qb);
         residual = (aSignificand << 113) - qb;
         quotientExponent--;
     } else {
         quotient >>= 1;
         wideMultiply(quotient, bSignificand, &dummy, &qb);
         residual = (aSignificand << 112) - qb;
     }

     const int writtenExponent = quotientExponent + exponentBias;

     if (writtenExponent >= maxExponent) {
         // If we have overflowed the exponent, return infinity.
         return fromRep(infRep | quotientSign);
     }
     else if (writtenExponent < 1) {
         // Flush denormals to zero.  In the future, it would be nice to add
         // code to round them correctly.
         return fromRep(quotientSign);
     }
     else {
         const bool round = (residual << 1) >= bSignificand;
         // Clear the implicit bit
         rep_t absResult = quotient & significandMask;
         // Insert the exponent
         absResult |= (rep_t)writtenExponent << significandBits;
         // Round
         absResult += round;
         // Insert the sign and return
         const long double result = fromRep(absResult | quotientSign);
         return result;
     }
 }

 #endif
	//===-- lib/divtf3.c - Quad-precision division --------------------- C --===//
	//
	// The LLVM Compiler Infrastructure
	//
	// This file is dual licensed under the MIT and the University of Illinois Open
	// Source Licenses. See LICENSE.TXT for details.
	//
	//===----------------------------------------------------------------------===//
	//
	// This file implements quad-precision soft-float division
	// with the IEEE-754 default rounding (to nearest, ties to even).
	//
	// For simplicity, this implementation currently flushes denormals to zero.
	// It should be a fairly straightforward exercise to implement gradual
	// underflow with correct rounding.
	//
	//===----------------------------------------------------------------------===//

	#define QUAD_PRECISION
	#include "fp_lib.h"

	#if defined(CRT_HAS_128BIT) && defined(CRT_LDBL_128BIT)
	COMPILER_RT_ABI fp_t __divtf3(fp_t a, fp_t b) {

	const unsigned int aExponent = toRep(a) >> significandBits & maxExponent;
	const unsigned int bExponent = toRep(b) >> significandBits & maxExponent;
	const rep_t quotientSign = (toRep(a) ^ toRep(b)) & signBit;

	rep_t aSignificand = toRep(a) & significandMask;
	rep_t bSignificand = toRep(b) & significandMask;
	int scale = 0;

	// Detect if a or b is zero, denormal, infinity, or NaN.
	if (aExponent-1U >= maxExponent-1U \|\| bExponent-1U >= maxExponent-1U) {

	const rep_t aAbs = toRep(a) & absMask;
	const rep_t bAbs = toRep(b) & absMask;

	// NaN / anything = qNaN
	if (aAbs > infRep) return fromRep(toRep(a) \| quietBit);
	// anything / NaN = qNaN
	if (bAbs > infRep) return fromRep(toRep(b) \| quietBit);

	if (aAbs == infRep) {
	// infinity / infinity = NaN
	if (bAbs == infRep) return fromRep(qnanRep);
	// infinity / anything else = +/- infinity
	else return fromRep(aAbs \| quotientSign);
	}

	// anything else / infinity = +/- 0
	if (bAbs == infRep) return fromRep(quotientSign);

	if (!aAbs) {
	// zero / zero = NaN
	if (!bAbs) return fromRep(qnanRep);
	// zero / anything else = +/- zero
	else return fromRep(quotientSign);
	}
	// anything else / zero = +/- infinity
	if (!bAbs) return fromRep(infRep \| quotientSign);

	// one or both of a or b is denormal, the other (if applicable) is a
	// normal number. Renormalize one or both of a and b, and set scale to
	// include the necessary exponent adjustment.
	if (aAbs < implicitBit) scale += normalize(&aSignificand);
	if (bAbs < implicitBit) scale -= normalize(&bSignificand);
	}

	// Or in the implicit significand bit. (If we fell through from the
	// denormal path it was already set by normalize( ), but setting it twice
	// won't hurt anything.)
	aSignificand \|= implicitBit;
	bSignificand \|= implicitBit;
	int quotientExponent = aExponent - bExponent + scale;

	// Align the significand of b as a Q63 fixed-point number in the range
	// [1, 2.0) and get a Q64 approximate reciprocal using a small minimax
	// polynomial approximation: reciprocal = 3/4 + 1/sqrt(2) - b/2. This
	// is accurate to about 3.5 binary digits.
	const uint64_t q63b = bSignificand >> 49;
	uint64_t recip64 = UINT64_C(0x7504f333F9DE6484) - q63b;
	// 0x7504f333F9DE6484 / 2^64 + 1 = 3/4 + 1/sqrt(2)

	// Now refine the reciprocal estimate using a Newton-Raphson iteration:
	//
	// x1 = x0 * (2 - x0 * b)
	//
	// This doubles the number of correct binary digits in the approximation
	// with each iteration.
	uint64_t correction64;
	correction64 = -((rep_t)recip64 * q63b >> 64);
	recip64 = (rep_t)recip64 * correction64 >> 63;
	correction64 = -((rep_t)recip64 * q63b >> 64);
	recip64 = (rep_t)recip64 * correction64 >> 63;
	correction64 = -((rep_t)recip64 * q63b >> 64);
	recip64 = (rep_t)recip64 * correction64 >> 63;
	correction64 = -((rep_t)recip64 * q63b >> 64);
	recip64 = (rep_t)recip64 * correction64 >> 63;
	correction64 = -((rep_t)recip64 * q63b >> 64);
	recip64 = (rep_t)recip64 * correction64 >> 63;

	// recip64 might have overflowed to exactly zero in the preceeding
	// computation if the high word of b is exactly 1.0. This would sabotage
	// the full-width final stage of the computation that follows, so we adjust
	// recip64 downward by one bit.
	recip64--;

	// We need to perform one more iteration to get us to 112 binary digits;
	// The last iteration needs to happen with extra precision.
	const uint64_t q127blo = bSignificand << 15;
	rep_t correction, reciprocal;

	// NOTE: This operation is equivalent to __multi3, which is not implemented
	// in some architechure
	rep_t r64q63, r64q127, r64cH, r64cL, dummy;
	wideMultiply((rep_t)recip64, (rep_t)q63b, &dummy, &r64q63);
	wideMultiply((rep_t)recip64, (rep_t)q127blo, &dummy, &r64q127);

	correction = -(r64q63 + (r64q127 >> 64));

	uint64_t cHi = correction >> 64;
	uint64_t cLo = correction;

	wideMultiply((rep_t)recip64, (rep_t)cHi, &dummy, &r64cH);
	wideMultiply((rep_t)recip64, (rep_t)cLo, &dummy, &r64cL);

	reciprocal = r64cH + (r64cL >> 64);

	// We already adjusted the 64-bit estimate, now we need to adjust the final
	// 128-bit reciprocal estimate downward to ensure that it is strictly smaller
	// than the infinitely precise exact reciprocal. Because the computation
	// of the Newton-Raphson step is truncating at every step, this adjustment
	// is small; most of the work is already done.
	reciprocal -= 2;

	// The numerical reciprocal is accurate to within 2^-112, lies in the
	// interval [0.5, 1.0), and is strictly smaller than the true reciprocal
	// of b. Multiplying a by this reciprocal thus gives a numerical q = a/b
	// in Q127 with the following properties:
	//
	// 1. q < a/b
	// 2. q is in the interval [0.5, 2.0)
	// 3. the error in q is bounded away from 2^-113 (actually, we have a
	// couple of bits to spare, but this is all we need).

	// We need a 128 x 128 multiply high to compute q, which isn't a basic
	// operation in C, so we need to be a little bit fussy.
	rep_t quotient, quotientLo;
	wideMultiply(aSignificand << 2, reciprocal, &quotient, &quotientLo);

	// Two cases: quotient is in [0.5, 1.0) or quotient is in [1.0, 2.0).
	// In either case, we are going to compute a residual of the form
	//
	// r = a - q*b
	//
	// We know from the construction of q that r satisfies:
	//
	// 0 <= r < ulp(q)*b
	//
	// if r is greater than 1/2 ulp(q)*b, then q rounds up. Otherwise, we
	// already have the correct result. The exact halfway case cannot occur.
	// We also take this time to right shift quotient if it falls in the [1,2)
	// range and adjust the exponent accordingly.
	rep_t residual;
	rep_t qb;

	if (quotient < (implicitBit << 1)) {
	wideMultiply(quotient, bSignificand, &dummy, &qb);
	residual = (aSignificand << 113) - qb;
	quotientExponent--;
	} else {
	quotient >>= 1;
	wideMultiply(quotient, bSignificand, &dummy, &qb);
	residual = (aSignificand << 112) - qb;
	}

	const int writtenExponent = quotientExponent + exponentBias;

	if (writtenExponent >= maxExponent) {
	// If we have overflowed the exponent, return infinity.
	return fromRep(infRep \| quotientSign);
	}
	else if (writtenExponent < 1) {
	// Flush denormals to zero. In the future, it would be nice to add
	// code to round them correctly.
	return fromRep(quotientSign);
	}
	else {
	const bool round = (residual << 1) >= bSignificand;
	// Clear the implicit bit
	rep_t absResult = quotient & significandMask;
	// Insert the exponent
	absResult \|= (rep_t)writtenExponent << significandBits;
	// Round
	absResult += round;
	// Insert the sign and return
	const long double result = fromRep(absResult \| quotientSign);
	return result;
	}
	}

	#endif