Fans and polytopes in tilting theory I: Foundations

Abstract

For a finite dimensional algebra A over a field k, the 2-term silting complexes of A gives a simplicial complex (A) called the g-simplicial complex. We give tilting theoretic interpretations of the h-vectors and Dehn-Sommerville equations of (A). Using g-vectors of 2-term silting complexes, (A) gives a nonsingular fan (A) in the real Grothendieck group K0(proj A)R called the g-fan. We give several basic properties of (A) including sign-coherence, sign decomposition, idempotent reductions, Jasso reductions, pairwise positivity and a connection with Newton polytopes of A-modules. Moreover, (A) gives a (possibly infinite and non-convex) polytope P(A) in K0(proj A)R called the g-polytope of A. We call A g-convex if P(A) is convex. In this case, we show that it is a reflexive polytope, and that the dual polytope is given by the 2-term simple minded collections of A. There are precisely 7 convex g-polyogons up to isomorphism. We give a classification of algebras whose g-polytopes are smooth Fano. We study g-fans and g-polytopes of two important classes of algebras. We show that the g-fan of a classical or generalized preprojective algebra is given by the Coxeter fan. It is g-convex if and only if it is of type A or B, and in this case, its g-polytope is the dual polytope of the short root polytope. Moreover we classify Brauer graph algebras which are g-convex, and describe their g-polytopes as the root polytopes of type A or C.