Singularity categories of skewed-gentle algebras

Abstract

Let K be an algebraically closed field. Let (Q,Sp,I) be a skewed-gentle triple, (Qsg,Isg) and (Qg,Ig) be its corresponding skewed-gentle pair and associated gentle pair respectively. It proves that the skewed-gentle algebra KQsg/< Isg> is singularity equivalent to KQ/< I>. Moreover, we use (Q,Sp,I) to describe the singularity category of KQg/< Ig>. As a corollary, we get that gldim KQsg/< Isg><∞ if and only if gldim KQ/< I><∞ if and only if gldim KQg/< Ig><∞.