Divisors in Residue Classes Revisited

Abstract

In 1984, H. W. Lenstra described an algorithm finding divisors of N congruent to r S. When S3 > N, this algorithm runs in polynomial time and hence factors N in time N1/3+o(1). Lenstra's algorithm relies on a sign change in a constructed sequence and so cannot be adapted directly to larger euclidean number rings. We present a new method that generalizes to a larger class of euclidean rings and the polynomial ring Z[x]. The algorithm is implemented and timed confirming its polynomial run time.

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