kcmp: fix standard comparison bug
The C operator <= defines a perfectly fine total ordering on the set of values representable in a long. However, unlike its namesake in the integers, it is not translation invariant, meaning that we do not have "b <= c" iff "a+b <= a+c" for all a,b,c. This means that it is always wrong to try to boil down the relationship between two longs to a question about the sign of their difference, because the resulting relation [a LEQ b iff a-b <= 0] is neither anti-symmetric or transitive. The former is due to -LONG_MIN==LONG_MIN (take any two a,b with a-b = LONG_MIN; then a LEQ b and b LEQ a, but a != b). The latter can either be seen observing that x LEQ x+1 for all x, implying x LEQ x+1 LEQ x+2 ... LEQ x-1 LEQ x; or more directly with the simple example a=LONG_MIN, b=0, c=1, for which a-b < 0, b-c < 0, but a-c > 0. Note that it makes absolutely no difference that a transmogrying bijection has been applied before the comparison is done. In fact, had the obfuscation not b...
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