# Multi-Precision Arithmetic on MIPS

I am just trying to implement multi-precision arithmetic on native MIPS. Assume that one 64-bit integer is in register \$12 and \$13 and another is in registers \$14 and \$15. The sum is to be placed in registers \$10 and \$11. The most significant word of the 64-bit integer is found in the even-numbered registers, and the least significant word is found in the odd-numbered registers. On the internet, it said, this is the shortest possible implementation.

``````addu  \$11, \$13, \$15    # add least significant word
sltu  \$10, \$11, \$15    # set carry-in bit
``````

I just wanna double check that I understand correctly. The sltu checks if the sum of the two least significant words is smaller or equal than one of the operands. If this is the case, than did a carry occur, is this right?

To check if there occured a carry when adding the two most significant words and store the result in \$9 I have to do:

``````sltu  \$9, \$10, \$12    # set carry-in bit
``````

Does this make any sense?

-

The sltu checks if the sum of the two least significant words is smaller or equal than one of the operands.

Not quite: it sets `\$10` to 1 if the sum of the two least significant words is strictly less than one of the operands (considered as 32-bit unsigned values); and 0 if the sum is equal to, or greater than, that operand.

If this is the case, than did a carry occur, is this right?

Yes.

Consider what can happen when adding various possible values of b to some particular value a (where everything is an unsigned 32-bit value):

• If overflow has not occurred, we must have a <= sum <= 0xFFFFFFFF, so 0 <= b <= (0xFFFFFFFF - a).
• The remaining cases for b cause an overflow; the actual sum in these cases must be 0x100000000 <= sum <= a + 0xFFFFFFFF, which when truncated to 32 bits gives 0 <= sum <= a - 1.

To check if there occured a carry when adding the two most significant words and store the result in \$9 I have to do:

`sltu \$9, \$10, \$12 # set carry-in bit`

Not quite.

The problem here is that you're adding two 32-bit values and possibly a carry from the sum of the least significant words. For example, consider the case where there is a carry and both most significant words are 0xFFFFFFFF: the sum will be 1+ 0xFFFFFFFF + 0xFFFFFFFF = 0xFFFFFFFF, and so the carry will not be set (but it should be).

One way to deal with this would be to check for carry after adding `\$12` to `\$10`, and check again after adding `\$11` to that sum. Only one of those sums can produce a carry (`\$12 + \$10` only overflows when `\$12` is 0xFFFFFFFF, because `\$10` is either 0 or 1; and in that case the sum is 0, so the second sum can't overflow as well).

So this might (disclaimer: it's late, and this is untested) do the trick:

``````addu \$11, \$13, \$15
sltu \$10, \$11, \$15  # carry from low word