Deterministic factorization of sums and differences of powers

Abstract

Let a,b∈ N be fixed and coprime such that a>b, and let N be any number of the form an bn, n∈N. We will generalize a result of Bostan, Gaudry and Schost and prove that we may compute the prime factorization of N in \[ O(Mint(N1/4 N)), \] Mint(k) denoting the cost for multiplying two k-bit integers. This result is better than the currently best known general bound for the runtime complexity for deterministic integer factorization.