Differences between perfect powers : prime power gaps

Abstract: We develop machinery to explicitly determine, in many instances, when the difference $x^2-y^n$ is divisible only by powers of a given fixed prime. This combines a wide variety of techniques from Diophantine approximation (bounds for linear forms in logarithms, both archimedean and non-archimedean, lattice basis reduction, methods for solving Thue-Mahler and $S$-unit equations, and the Primitive Divisor Theorem of Bilu, Hanrot and Voutier) and classical Algebraic Number Theory, with results derived from the modularity of Galois representations attached to Frey-Hellegoaurch elliptic curves. By way of example, we completely solve the equation [ x^2+q^\alpha = y^n, ] where $2 \leq q < 100$ is prime, and $x, y, \alpha$ and $n$ are integers with $n \geq 3$ and $\gcd (x,y)=1$.