# Modulo arithmetic with signed integers undefined behavior in c?

Having read all answers and comments in Should you always use 'int' for numbers in C, even if they are non-negative? I'm still not sure what to do in the following situation.

Two remote devices are counting events at their respective location. They regularly report the counter readings to a PC where a feedback algorithm somehow keeps the difference of the counter readings within bounds. The sequences of events are endless so that the readings are reported modulo 2^n. For modulo arithmetic unsigned integers are suggested. The difference, however, may well become negative. Casting the readings to signed integers before calculating the difference works fine on the platform I tested it on (that is, I get the differences modulo 2^n with values small in magnitude). Declaring the readings as signed already in the interface yields elegant code. However, the code shall be portable. Shall I take the U.B. warning seriously?

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One option to consider: if the values from the counters are 16-bit unsigned numbers, you could arrange to read them into 32-bit signed numbers. Or if they're 32-bit, you could read them into 64-bit numbers. Then the differences are defined, and negatives will be negative, etc. –  Jonathan Leffler Apr 14 '13 at 2:01
@JonathanLeffler negatives will be negative, but their modular residues will stay undefined. –  Jan Dvorak Apr 14 '13 at 2:05
@JonathanLeffler: Thank you for this idea. Seems to be faster and more legible than solutions based on branching. –  Rainald62 Apr 16 '13 at 23:17
@Jan: Modular residues are unambiguous as I know that the magnitude of the difference is small. –  Rainald62 Apr 16 '13 at 23:38
Thinking about both comments I found another solution: Calculating the difference with unsigned numbers, addition of 2^(n-2) to it, cast to signed (result is safely in the positive range), subtraction of 2^(n-2). This shall be well-defined and is hopefully optimized by the compiler to just taking the difference on all existing platforms. –  Rainald62 Apr 16 '13 at 23:38