The local geometry of the stack of Ar-stable curves

Abstract

In this paper we study the local geometry of the stack of pointed Ar-stable curves. In particular, we analyze the deformation theory of Ar-stable curves and their automorphism groups in order to study the combinatorics of families of curves over [A1/Gm], and use this to classify all closed points of the stack of Ar-stable curves. As a byproduct, we also classify all open substacks of the moduli stack of degree 2 cyclic covers of P1 that admit a separated good moduli space. This is the first in a series of three papers aimed at studying obstructions for the existence of good moduli spaces for stacks of curves with A-type singularities, and using these to find an open substack of the stack of Ar-stable curves that admits a proper non-projective good moduli space when r=5.

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