Periods modulo p of integer sequences associated with division polynomials of genus 2 curves

Abstract

We study an integer sequence associated with Cantor's division polynomials of a genus 2 curve having an integral point. We show that the reduction modulo p of such a sequence is periodic for all but finitely many primes p, and describe the relation between the period of the reduction modulo p of the sequence and the order of the integral point on the reduction modulo p in the Jacobian variety explicitly. This generalizes Ward's results on elliptic divisibility sequences associated with division polynomials of elliptic curves.

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