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I cant figure out the post-corrections to non-restoring integer division. For some reason I keep getting cases where I correct where no corrections are needed or don't correct when needed

heres pseudocode of the algorithm. Dividend is 16bits and others 8 bits. By Dividend_Sign, Remainder_Sign I mean their MSB is 1, so they are negative by 2's complement.

LoopCounter = 8;
do {
    Shift Dividend Left with 0 in LSB;

    if (Dividend_Sign XOR Divisor_Sign) {
        Shift 0 into Quotient;
        DividendHighByte = DividendHighByte + Divisor;
    } else {
        shift 1 into Quotient;
        DividendHighByte = DividendHighByte - Divisor;  // subtraction by 2's complement
} while (loopCounter != 0);

Remainder = DividendHighByte;

// here i do the Quotient conversion
invert MSB;  // shifted out anyway. Probably should be used for overflow check, not important atm.
shift 1 into Quotient;

now im at a point where i basically have the right answer, it just needs to be post-corrected in one way or another... OR not post-corrected at all. Im not sure what all the correction cases are. right now i have something that isnt working half the time, but here it is anyway:

if (Dividend_Sign XOR Remainder_sign) {     // diff signs so correct
    if (Remainder_Sign XOR Divisor_Sign) {  // diff signs just add
        Remainder = Remainder + Divisor;
        Quotient = Quotient - 1;
    } else {
        Remainder = Remainder - Divisor;
        Quotient = Quotient + 1;



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Could you elaborate on, or at least enumerate, the cases that don't work? –  Scott Hunter Apr 22 '12 at 23:38
atm found -10:2 and -10:-2 are correct precorrection and the correction messes it up. -16:4 needs to correct, but doesnt. I think it has something to do with them having a 0 remainder. –  ollo Apr 23 '12 at 0:10
Please explain the requirements that you need for the remainder once the correction is complete (ignoring for the moment HOW that correction is accomplished). –  Scott Hunter Apr 23 '12 at 0:16
Well i need it to be a correct binary representation of the remainder. Not sure what you mean by requirements for it to be correct- Quotient*Divisor + Remainder = Dividend. I correct when the remainder has a different sign than the dividend originally. -10:2 produces 11111011 Quotient, 0000000 remainder pre-correction. 11111100 Q, 11111110 remainder post-correction. In this case i don't need to correct, but the algorith calls for it anyway. –  ollo Apr 23 '12 at 0:24
What about -16:4? –  Scott Hunter Apr 23 '12 at 0:36

1 Answer 1

up vote 1 down vote accepted

The algorithm works, the problem is 2s complement has a negative zero. If the final remainder is 0 no corrections are ever necessary. But the algorithm must detect a 0 remainder within cycles and if one is encountered corrections are always necessary.

Just added a 0 remainder flag and did this:

if (!Remainder.isEmpty() && (zeroFlag || (Dividend.Sign() XOR Remainder.Sign())))
      ...do corrections
share|improve this answer
2's complement doesn't have a negative zero. 1's complement does and so does sign-magnitude. –  Alexey Frunze Apr 25 '12 at 23:58
This is actually a valuable answer on post-corrections in signed non-restoring division scheme. Usually case for zero partial remainder or final remainder is not considered at all, for example google.ru/search?q=computer+arithmetics+behrooz+parhami+pdf , though normal postcorrection is considered there. Without zero-remainder post-correction cases the algorithm would eventually give wrong results which differ +-1 from true answer (I'm now only considering quotient, not resulting remainder). The described fix seems to return correct quotient in 100% cases. –  lvd Jan 21 at 5:22

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