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Galois coverings and simple connectedness of piecewise hereditary algebras (2007)

Le Meur, Patrick

Abstract

Let A a basic connected and finite dimensional piecewise hereditary algebra of type Q. We prove that A admits a universal Galois covering with group the fundamental group of Q. As a corollary, we deduce that A is simply connected if and only if Q is a tree, if and only if the Hocschild cohomology group HH^1(A) vanishes. As an application, we prove that if C->A is a Galois covering with group G, then C is piecewise hereditary of type a Galois covering with group G of Q.

Publication details

Download	http://hal.archives-ouvertes.fr/hal-00131235/en/
Publisher	HAL - CCSD
Repository	INRIA a CCSD electronic archive server based on P.A.O.L (France)
Keywords	Mathematics/Representation Theory, algebra, finite dimensional, piecewise hereditary, cluster, tilting, galois covering, universal cover, simply connected, covering techniques, hochschild cohomology, dg category
Language	English
Relation	http://hal.inria.fr/docs/00/14/43/39/PDF/galois_ph.pdf