English

Split-by-nilpotent extensions algebras and stratifying systems

Representation Theory 2013-04-22 v1

Abstract

Let Γ\Gamma and Λ\Lambda be artin algebras such that Γ\Gamma is a split-by-nilpotent extension of Λ\Lambda by a two sided ideal II of Γ.\Gamma. Consider the so-called change of rings functors G:=ΓΓΛΛG:={}_\Gamma\Gamma_\Lambda\otimes_\Lambda - and F:=ΛΛΓΓ.F:={}_\Lambda \Lambda_\Gamma\otimes_\Gamma -. In this paper, we find the necessary and sufficient conditions under which a stratifying system (Θ,)(\Theta,\leq) in \moduΛ\modu\Lambda can be lifted to a stratifying system (GΘ,)(G\Theta,\leq) in \modu(Γ).\modu\,(\Gamma). Furthermore, by using the functors FF and G,G, we study the relationship between their filtered categories of modules and some connections with their corresponding standardly stratified algebras are stated. Finally, a sufficient condition is given for stratifying systems in \modu(Γ)\modu\,(\Gamma) in such a way that they can be restricted, through the functor F,F, to stratifying systems in \modu(Λ).\modu\,(\Lambda).

Keywords

Cite

@article{arxiv.1304.5289,
  title  = {Split-by-nilpotent extensions algebras and stratifying systems},
  author = {Marcelo Lanzilotta and Octavio Mendoza and Corina Sáenz},
  journal= {arXiv preprint arXiv:1304.5289},
  year   = {2013}
}
R2 v1 2026-06-22T00:02:42.543Z