Minimal Weierstrass models and regular models of hyperelliptic curves
Abstract
Let C be a hyperelliptic curve of genus g 2 over a discrete valuation field K with perfect residue field. We study the minimal Weierstrass models of C. When there is more than one such model, we find interesting properties on the minimal regular model and the canonical model of C. For curves of genus 2, we characterize the existence of the stable reduction in terms of the minimal Weierstrass models. When there is more than one such model, we can compute the Euler factor of Jac(C) and a volume form of the Néron model of Jac(C), using two specific minimal Weierstrass models.
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