That fragment of code implements the well known "fast exponentiation" algorithm, also known as Exponentiation by squaring.
It also uses the fact that (a * b) mod p = ((a mod p) * (b mod p)) mod p. (Both addition and multiplications are preserved structures under taking a prime modulus -- it is a homomorphism). This way at every point in the algorithm it reduces to numbers smaller than p.
While you could try to calculate these in an interleaved fashion in a loop, there's no real benefit to doing so. Just calculate them separately, multiply them together, and take the mod one last time.
Be warned that you will get overflow if p^2 is greater than the largest representable int, and that this will cause you to have the wrong answer. For Java, switching to big integer might be prudent, or at least doing a runtime check on the size of p and throwing an exception.
Finally, if this is for cryptographic purposes, you should probably be using a library to do this, rather than implementing it yourself. It's very easy to do something slightly wrong that appears to work, but provides minimal to no security.