Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

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;
    }
}

http://en.wikipedia.org/wiki/Division_%28digital%29

http://www.acsel-lab.com/arithmetic/papers/ARITH17/ARITH17_Takagi.pdf

share|improve this question
    
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
4  
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

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.