Hochschild cohomology, finiteness conditions and a generalisation of d-Koszul algebras

Abstract

Given a finite-dimensional algebra and A ≥slant 1, we construct a new algebra A, called the stretched algebra, and relate the homological properties of and A. We investigate Hochschild cohomology and the finiteness condition (Fg), and use stratifying ideals to show that has (Fg) if and only if A has (Fg). We also consider projective resolutions and apply our results in the case where is a d-Koszul algebra for some d ≥slant 2.