//===-- lib/comparesf2.c - Single-precision comparisons -----------*- 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 the following soft-fp_t comparison routines:
//
//   __eqsf2   __gesf2   __unordsf2
//   __lesf2   __gtsf2
//   __ltsf2
//   __nesf2
//
// The semantics of the routines grouped in each column are identical, so there
// is a single implementation for each, and wrappers to provide the other names.
//
// The main routines behave as follows:
//
//   __lesf2(a,b) returns -1 if a < b
//                         0 if a == b
//                         1 if a > b
//                         1 if either a or b is NaN
//
//   __gesf2(a,b) returns -1 if a < b
//                         0 if a == b
//                         1 if a > b
//                        -1 if either a or b is NaN
//
//   __unordsf2(a,b) returns 0 if both a and b are numbers
//                           1 if either a or b is NaN
//
// Note that __lesf2( ) and __gesf2( ) are identical except in their handling of
// NaN values.
//
//===----------------------------------------------------------------------===//

#define SINGLE_PRECISION
#include "fp_lib.h"

enum LE_RESULT {
    LE_LESS      = -1,
    LE_EQUAL     =  0,
    LE_GREATER   =  1,
    LE_UNORDERED =  1
};

enum LE_RESULT __lesf2(fp_t a, fp_t b) {
    
    const srep_t aInt = toRep(a);
    const srep_t bInt = toRep(b);
    const rep_t aAbs = aInt & absMask;
    const rep_t bAbs = bInt & absMask;
    
    // If either a or b is NaN, they are unordered.
    if (aAbs > infRep || bAbs > infRep) return LE_UNORDERED;
    
    // If a and b are both zeros, they are equal.
    if ((aAbs | bAbs) == 0) return LE_EQUAL;
    
    // If at least one of a and b is positive, we get the same result comparing
    // a and b as signed integers as we would with a fp_ting-point compare.
    if ((aInt & bInt) >= 0) {
        if (aInt < bInt) return LE_LESS;
        else if (aInt == bInt) return LE_EQUAL;
        else return LE_GREATER;
    }
    
    // Otherwise, both are negative, so we need to flip the sense of the
    // comparison to get the correct result.  (This assumes a twos- or ones-
    // complement integer representation; if integers are represented in a
    // sign-magnitude representation, then this flip is incorrect).
    else {
        if (aInt > bInt) return LE_LESS;
        else if (aInt == bInt) return LE_EQUAL;
        else return LE_GREATER;
    }
}

enum GE_RESULT {
    GE_LESS      = -1,
    GE_EQUAL     =  0,
    GE_GREATER   =  1,
    GE_UNORDERED = -1   // Note: different from LE_UNORDERED
};

enum GE_RESULT __gesf2(fp_t a, fp_t b) {
    
    const srep_t aInt = toRep(a);
    const srep_t bInt = toRep(b);
    const rep_t aAbs = aInt & absMask;
    const rep_t bAbs = bInt & absMask;
    
    if (aAbs > infRep || bAbs > infRep) return GE_UNORDERED;
    if ((aAbs | bAbs) == 0) return GE_EQUAL;
    if ((aInt & bInt) >= 0) {
        if (aInt < bInt) return GE_LESS;
        else if (aInt == bInt) return GE_EQUAL;
        else return GE_GREATER;
    } else {
        if (aInt > bInt) return GE_LESS;
        else if (aInt == bInt) return GE_EQUAL;
        else return GE_GREATER;
    }
}

int __unordsf2(fp_t a, fp_t b) {
    const rep_t aAbs = toRep(a) & absMask;
    const rep_t bAbs = toRep(b) & absMask;
    return aAbs > infRep || bAbs > infRep;
}

// The following are alternative names for the preceeding routines.

enum LE_RESULT __eqsf2(fp_t a, fp_t b) {
    return __lesf2(a, b);
}

enum LE_RESULT __ltsf2(fp_t a, fp_t b) {
    return __lesf2(a, b);
}

enum LE_RESULT __nesf2(fp_t a, fp_t b) {
    return __lesf2(a, b);
}

enum GE_RESULT __gtsf2(fp_t a, fp_t b) {
    return __gesf2(a, b);
}