The moduli stack of $A_r$-stable curves

Abstract: This paper is the first in a series of four papers aiming to describe the (almost integral) Chow ring of $\bar{\mathcal{M}}3$, the moduli stack of stable curves of genus $3$. In this paper, we introduce the moduli stack $\tilde{\mathcal{M}}{g,n}^r$ of $n$-pointed $A_r$-stable curves and extend some classical results about $\bar{\mathcal{M}}{g,n}$ to $\tilde{\mathcal{M}}{g,n}^r$, namely the existence of the contraction morphism. Moreover, we describe the normalization of the locally closed substack of $\tilde{\mathcal{M}}_{g,n}^r$ parametrizing curves with $A_h$-singularities for a fixed $h\leq r$.