Burt-Butler algebras of the bocs associated to a finite partially ordered set

Abstract

Given an algebra A and an A-A-bimodule U with co-algebra structure, a bocs, the algebras of endomorphisms of A as left or right module of the bocs are known as Burt-Butler algebras (up to an appropriate opposite). Here we give a description of these algebras for the bocs associated to a finite partially ordered set in terms of incidence algebras and their balanced versions. We also exhibit their quasi-hereditary structure, provide bound quiver presentations for their Ringel duals, describe the embedding of A as exact Borel subalgebra and characterize the corresponding subcategories of induced and co-induced modules.