Extension-closed subcategories over hypersurfaces of finite or countable CM-representation type

Abstract

Let k be an algebraically closed uncountable field of characteristic zero. Let R be a complete local hypersurface over k. Denote by CM(R) the category of maximal Cohen-Macaulay R-modules and by Dsg(R) the singularity category of R. Denote by CM0(R) the full category of CM(R) consisting of modules that are locally free on the punctured spectrum of R, and by Dsg0(R) the full subcategory of Dsg(R) consisting of objects that are locally zero on the punctured spectrum of R. In this paper, under the assumption that R has finite or countable CM-representation type, we completely classify the extension-closed subcategories of CM0(R) in dimension at most two, and the extension-closed subcategories of Dsg0(R) in arbitrary dimension.