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Is there any way to get correct rounding with the i387 fsqrt instruction?...

...aside from changing the precision mode in the x87 control word - I know that's possible, but it's not a reasonable solution because it has nasty reentrancy-type issues where the precision mode will be wrong if the sqrt operation is interrupted.

The issue I'm dealing with is as follows: the x87 fsqrt opcode performs a correctly-rounded (per IEEE 754) square root operation in the precision of the fpu registers, which I'll assume is extended (80-bit) precision. However, I want to use it to implement efficient single and double precision square root functions with the results correctly rounded (per the current rounding mode). Since the result has excess precision, the second step of converting the result to single or double precision rounds again, possibly leaving a not-correctly-rounded result.

With some operations it's possible to work around this with biases. For instance, I can avoid excess precision in the results of addition by adding a bias in the form of a power of two that forces the 52 significant bits of a double precision value into the last 52 bits of the 63-bit extended-precision mantissa. But I don't see any obvious way to do such a trick with square root.

Any clever ideas?

(Also tagged C because the intended application is implementation of the C sqrt and sqrtf functions.)

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Out of curiosity: Is there any reason you can't use SSE2 math here? –  duskwuff Mar 13 '12 at 4:20
Because the target is all x86 machines, not post-Pentium-2 or whatever. –  R.. Mar 13 '12 at 4:24
Doesn't storing it 4 or 8 byte memory do the rounding? Or is that too much overhead? –  Mysticial Mar 13 '12 at 8:31
That performs a second rounding step. Suppose I ask you to round 1.49 to an integer. Rounding it as one step yields 1. First rounding it to one place after the decimal point yields 1.5, then rounding it to an integer yields 2. Similarly, fsqrt performs one rounding (since the exact value of square root is almost never representable) and converting it from 80-bit extended precision to the right type performs another rounding. –  R.. Mar 13 '12 at 15:11
Oh ic what you mean. I'm tempted to think that the mathematical properties of the square root will prohibit such edge cases from ever occurring. But that's a little bit outside my area of expertise. –  Mysticial Mar 13 '12 at 15:43

3 Answers 3

up vote 13 down vote accepted

First, let's get the obvious out of the way: you should be using SSE instead of x87. The SSE sqrtss and sqrtsd instructions do exactly what you want, are supported on all modern x86 systems, and are significantly faster as well.

Now, if you insist on using x87, I'll start with the good news: you don't need to do anything for float. You need 2p + 2 bits to compute a correctly rounded square-root in a p-bit floating-point format. Because 80 > 2*24 + 2, the additional rounding to single-precision will always round correctly, and you have a correctly rounded square root.

Now the bad news: 80 < 2*53 + 2, so no such luck for double precision. I can suggest several workarounds; here's a nice easy one off the top of my head.

  1. let y = round_to_double(x87_square_root(x));
  2. use a Dekker (head-tail) product to compute a and b such that y*y = a + b exactly.
  3. compute the residual r = x - a - b.
  4. if (r == 0) return y
  5. if (r > 0), let y1 = y + 1 ulp, and compute a1, b1 s.t. y1*y1 = a1 + b1. Compare r1 = x - a1 - b1 to r, and return either y or y1, depending on which has the smaller residual (or the one with zero low-order bit, if the residuals are equal in magnitude).
  6. if (r < 0), do the same thing for y1 = y - 1 ulp.

This proceedure only handles the default rounding mode; however, in the directed rounding modes, simply rounding to the destination format does the right thing.

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+1 The only time double-rounding can go bad is if the first rounding is up. Forced truncation will get rid of this problem. –  Mysticial Mar 13 '12 at 18:26
@Mysticial: it's not true that double-rounding is only a problem if the first rounding is up. Consider a value of the form ...0 100...00 0...1 (where the spaces denote the round points). If we round directly to the first round point, we round up to ...1. However, if we first round to the second rounding point, we round down to ...0 100...00; rounding again at the first round point rounds down to ...0. –  Stephen Canon Mar 13 '12 at 18:33
Of course I fail to consider the round-to-even case... –  Mysticial Mar 13 '12 at 18:38
(The Dekker product is called "Mul22" in crlibm, by the way) –  Stephen Canon Mar 13 '12 at 19:14
Actually I think it's Mul12Cond, but thanks for the reference; I was able to find it with that. Having reviewed the algorithm casually, this seems to fully answer the question, so accepted! –  R.. Mar 13 '12 at 19:34

OK, I think I have a better solution:

  1. Compute y=sqrt(x) in extended precision (fsqrt).
  2. If last 11 bits are not 0x400, simply convert to double precision and return.
  3. Add 0x100-(fpu_status_word&0x200) to the low word of the extended precision representation.
  4. Convert to double precision and return.

Step 3 is based on the fact that the C1 bit (0x200) of the status word is 1 if and only if fsqrt's result was rounded up. This is valid because, due to the test in step 2, x was not a perfect square; if it were a perfect square, y would have no bits beyond double precision.

It may be faster to perform step 3 with a conditional floating point operating rather than working on the bit representation and reloading.

Here's the code (seems to work in all cases):

    fldl 4(%esp)
    fstsw %ax
    sub $12,%esp
    fld %st(0)
    fstpt (%esp)
    mov (%esp),%ecx
    and $0x7ff,%ecx
    cmp $0x400,%ecx
    jnz 1f
    and $0x200,%eax
    sub $0x100,%eax
    sub %eax,(%esp)
    fstp %st(0)
    fldt (%esp)
1:  add $12,%esp
    fstpl 4(%esp)
    fldl 4(%esp)
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This approach seems sound, on cursory inspection (and is certainly closer to what I would choose in implementing a library myself). You might run it on Jerome Coonen's test vectors for an additional data point. Why fld + fstp instead of fst? –  Stephen Canon Mar 15 '12 at 13:13
As far as I know, there is no extended-precision version of fst, only fstp. –  R.. Mar 15 '12 at 16:54
huh, how about that. –  Stephen Canon Mar 15 '12 at 17:03

It may not be what you want, as it doesn't take advantage of the 387 fsqrt instruction, but there's a surprisingly efficient sqrtf(float) in glibc implemented with 32-bit integer arithmetic. It even handles NaNs, Infs, subnormals correctly - it might be possible to eliminate some of these checks with real x87 instructions / FP control word flags. see: glibc-2.14/sysdeps/ieee754/flt-32/e_sqrtf.c

The dbl-64/e_sqrt.c code is not so friendly. It's hard to tell what assumptions are being made at a glance. Curiously, the library's i386 sqrt[f|l] implementations just call fsqrt, but load the value differently. flds for SP, fldl for DP.

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I'll look at the integer code. I wonder if there's a similar approach for double precision.. –  R.. Mar 13 '12 at 17:55
Hmm, that looks like the standard fdlibm code, which is known to be slow.. –  R.. Mar 13 '12 at 17:59
@R.., I suspected it might be. What are the error bounds for an IEEE-754 sqrt? Is it 1/2(ulp)? Does the rounding mode affect the internal calculation, or just returned value? –  Brett Hale Mar 13 '12 at 18:10
The result is just supposed to be correctly rounded in the current rounding mode. Transcendental functions are less strict; they need not be correctly rounded as long as the returned result is correct within 1ulp. –  R.. Mar 13 '12 at 18:47

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