Potential good reduction of hyperelliptic curves
Abstract
Let K be a number field, and g ≥ 2 a positive integer. We define cK(g) as the smallest integer n such that there exist infinitely many K-isomorphism classes of genus g hyperelliptic curves C/K with all Weierstrass points in K having potentially good reduction outside n primes in K. We show that cK(g) > πK, odd(2g) + 1, where πK, odd(n) denotes the number of odd primes in K with norm no greater than n, as well as present a summary of various conditional and unconditional results on upper bounds for cK(g).
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