Local constancy of reduction type and related invariants for curves in $p$-adic families

TL;DR

This paper proves that the reduction type and certain invariants of algebraic curves remain locally constant within p-adic families, providing new insights into their stability under small perturbations.

Contribution

It establishes local constancy results for reduction types and related invariants of curves in p-adic families, extending understanding of their behavior under coefficient perturbations.

Findings

Reduction type is locally constant in p-adic families.

Tamagawa number remains locally constant.

Galois representation invariants are locally constant.

Abstract

We investigate the behaviour of the reduction type and related invariants of curves in families of curves over a discretely valued field. By a family, we will mean a set of curves obtained by perturbing the coefficients of the defining equations. We will show that the reduction type in these families is locally constant in the topology induced by the valuation. We also derive local constancy results for some related invariants, such as the Tamagawa number, the Birch and Swinnerton-Dyer 'fudge factor' and the Galois representation.