Igusa-Todorov and LIT algebras on Morita context algebras

Abstract

In this article, we prove that, under certain conditions, Morita context algebras that arise from Igusa-Todorov (LIT) algebras and have zero bimodule morphisms are also Igusa-Todorov (LIT). For a finite dimensional algebra A, we prove that the class φ0-1(A) = \M: φ(M)=0\ is a 0-Igusa-Todorov subcategory if and only if A is selfinjective or gl l(A)< ∞. As a consequence A is an (n,V, φ0-1(A)) algebra if and only if A is selfinjective or gl(A)< ∞. We also show that the opposite algebra of a LIT algebra is not LIT in general.