Java does not have "unsigned" long values, of course, but sometimes signed long values are effectively treated as unsigned long values (the result of
System.nanoTime(), for example). In this sense, arithmetic overflow doesn't so much mean overflow of a value as much as it means overflow of the 64-bit representation. Examples:
Long.MAX_VALUE * 2L // overflows the signed product but not the unsigned product Long.MAX_VALUE * 4L // overflows the signed product and the unsigned product -1L * 2L // overflows the unsigned product but not the signed product
Testing whether a multiplication overflows seems to be somewhat complicated, since the sign-iness of the operations gets in the way. It may be helpful to note that any negative value multiplied by any value other than 0 or 1 will overflow the unsigned product, since the highest bit of the negative value is set.
What would be the best way to determine whether the product of two "unsigned" long values—which are really signed long values—would overflow the 64-bit representation? Using instances of
BigInteger is an obvious solution, and I've derived a convoluted test involving only primitive operations, but I feel like I'm missing something obvious.