Piecewise Hereditary Incidence Algebras

Abstract

Let K be the incidence algebra associated with a finite poset (,) over the algebraically closed field K. We present a study of incidence algebras K that are piecewise hereditary, which we denominate PHI algebras. We investigate the strong global dimension, the simply conectedeness and the one-point extension algebras over a PHI algebras. We also give a positive answer to the so-called Skowro\'nski problem for K a PHI algebra which is not of wild quiver type. That is for this kind of algebra we show that HH1(K) is trivial if, and only if, K is a simply connected algebra. We determine an upper bound for the strong global dimension of PHI algebras; furthermore, we extend this result to sincere algebras proving that the strong global dimension of a sincere piecewise hereditary algebra is less or equal than three.