Homological Dimensions of Gentle Algebras via Geometric Models

Abstract

Let A=kQ/I be a finite dimensional basic algebra over an algebraically closed field k which is a gentle algebra with the marked ribbon surface (SA,MA,A). It is known that SA can be divided into some elementary polygons \i 1 i d\ by A which has exactly one side in the boundary of SA. Let C(i) be the number of sides of i belonging to A if the unmarked boundary component of SA is not a side of i; otherwise, C(i)=∞, and let f- be the set of all non-∞-elementary polygons and FA (respectively, f-FA) the set of all forbidden threads (respectively, of finite length). Then we have enumerate [ (1)] The global dimension of A=1≤ i≤ dC(i)-1 =∈FA l(), where l() is the length of . [ (2)] The left and right self-injective dimensions of A= center cases 0,\ if Q is either a point or an oriented cycle with full relations;\\ _i∈f-\1, C(i)-1 \= ∈f-FA l(),\ otherwise. cases center enumerate As a consequence, we get that the finiteness of the global dimension of gentle algebras is invariant under AG-equivalence. In addition, we get that the number of indecomposable non-projective Gorenstein projective modules over gentle algebras is also invariant under AG-equivalence.