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As homework, I'm implementing Karatsuba's algorithm and benchmarking it against a primary-school-style O(n^2) multiplication algorithm on large integers.

I guessed my only choice here was to bring the numbers to their byte array representations and then work them from there.

Well, I'm stuck here... when using the * operator, I don't know how would I detect/correct if the number overflows a byte multiplication or adds a carry. Any ideas?

public static BigInteger simpleMultiply(BigInteger x, BigInteger y){

        //BigInteger result = x.multiply(y);

        byte [] xByteArray = x.toByteArray();
        byte [] yByteArray = y.toByteArray();

        int resultSize = xByteArray.length*yByteArray.length;

        byte [][] rowsAndColumns = new byte[resultSize][resultSize];

        for (int i =0; i<xByteArray.length;i++)
           for (int j=0; j<yByteArray.length;j++){

               rowsAndColumns[i][j] = (byte )(xByteArray[i] * yByteArray[j]); 
               // how would I detect/handle carry or overflow here?               

        return null;
share|improve this question
Two months ago I've written up a big-number tutorial here, which also includes a multiplication. It does not use bytes but int values (in the range 0 ... 1000000000), which are multiplicated as long to avoid overflow. – Paŭlo Ebermann May 15 '11 at 15:23
@Paulo: thanks but I need integers of a 1000 digits. – andandandand May 15 '11 at 19:55
up vote 2 down vote accepted

The result of a byte multiplication is 2 bytes. You have to use the low order byte as the result and the high order byte as the carry (overflow).

I would also advise you to be careful of the sign of your bytes. Since bytes in Java are signed, you'll have to either use only the low 7 bits of them or convert them to ints and correct the sign before multiplying them.

You'll want a loop like:

        for (int i =0; i<xByteArray.length;i++)
           for (int j=0; j<yByteArray.length;j++){
               // convert bytes to ints
               int xDigit = xByteArray[i], yDigit = yByteArray[j];
               // convert signed to unsigned
               if (xDigit < 0)
                   xDigit += 256;
               if (yDigit < 0)
                   yDigit += 256;
               // compute result of multiplication
               int result = xDigit * yDigit;
               // capture low order byte
               rowsAndColumns[i][j] = (byte)(result & 0xFF);
               // get overflow (high order byte)
               int overflow = result >> 8;
               // handle overflow here
               // ...
share|improve this answer
low order/high order? how? – andandandand May 15 '11 at 4:20
What's a low order/high order byte? The low 7 bits of each byte is the low order byte? – andandandand May 15 '11 at 4:30
When you multiply 2 individual digits (say, 9 * 9) you get a 2-digit result (81). In this example, the 8 would be the high order digit and the 1 would be the low order digit. If you multiply 2 individual bytes (say, 0xFF * 0xFF), you get a 2-byte result (0xFE01). In this example the 0xFE would be the high order byte and the 0x01 would be the low order byte. – Gabe May 15 '11 at 4:34
could you explain the lines rowsAndColumns[i][j] = (byte)(result & 0xFF); and int overflow = result >> 8;? I'm not familiar with byte arithmetic/shifting and I'd like to understand the logic. – andandandand May 15 '11 at 4:35
If you're unfamiliar with bit arithmetic, I recommend a quick tutorial, such as – Gabe May 15 '11 at 4:43

The best way to avoid overflow is not to have it happen in the first place. Make all your calculations with a higher width numbers to avoid problems.

For example, lets say we have base 256 numbers and each digit is stored as a single unsigned byte.

d1 = (int) digits[i] //convert to a higher-width number
d2 = (int) digits[j]
product = d1*d2  //ints can handle up to around 2^32. Shouldn't overflow w/ 256*256
result = product % 256
carry  = product / 256

You could be fancy and convert the divisions by powers of two into bit operations, but it isn't really necessary.

share|improve this answer
this doesn't handle the carry problem. – andandandand May 15 '11 at 20:08
It does, as long as the type you use to do the math (in my example, int) is twice as wide as the type used to store the numbers (in the case bytes). This is just how in 4-th grade you store numbers with one digit but do the multiplications with two digits. – hugomg May 15 '11 at 20:19
Sorry, didn't read right. – andandandand May 15 '11 at 21:33

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