ICE-closed subcategories and epibricks over one-point extensions

Abstract

Let B be the one-point extension algebra of A by an A-module M. We proved that every ICE-closed subcategory in A can be extended to be some ICE-closed subcategories in B.In the same way, every epibrick in A can be extended to be some epibricks in B.The number of ICE-closed subcategories in B and the number of ICE-closed subcategories in A are denoted respectively as m, n.We can conclude the following inequality:m ≥ 2n This is the analogical in epibricks.As an application, we can get some wide τ-tilting modules of B by wide τ-tilting modules of A.