This question has been pretty comfortably answered already in practice, but there is one point I mention below which I have not seen anyone else raise yet.

Since we were told to assume a >= 0, and the first condition assures that b - (a + p) >= 0, the bracketed || tests can be turned into tests against inequality with 1:

(a + p <= b) && (a != 1) && (b >= p) && (b - a - p != 1)

It is tempting to remove the check (b >= p), which would give nickf's expression. And this is almost certainly the correct practical solution. Unfortunately, we need to know more about the problem domain before being able to say if it is safe to do that.

For instance, if using C and 32-bit unsigned ints for the types of a, b, and p, consider the case where a = 2^31 + 7, p = 2^31 + 5, b = 13. We have a > 0, (a + p) = 12 < b, but b < p. (I'm using '^' to indicate exponentiation, not C bitwise xor.)

Probably your values will not approach the kind of ranges where this sort of overflow is an issue, but you should check this assumption. And if it turns out to be a possibility, add a comment with that expression explaining this so that some zealous future optimiser does not carelessly remove the (b >= p) test.