Abstract
In the context of representation theory of finite dimensional algebras, string algebras have been extensively studied and most aspects of their representation theory are well-understood. One exception to this is the classification of extensions between indecomposable modules. In this paper we explicitly describe such extensions for a class of string algebras, namely gentle algebras associated to surface triangulations. These algebras arise as Jacobian algebras of unpunctured surfaces. We relate the extension spaces of indecomposable modules to crossings of generalised arcs in the surface and give explicit bases of the extension spaces for indecomposable modules in almost all cases. We show that the dimensions of these extension spaces are given in terms of crossing arcs in the surface.Our approach is new and consists of interpreting snake graphs as indecomposable modules. In order to show that our basis is a spanning set, we need to work in the associated cluster category where we explicitly calculate the middle terms of extensions and give bases of their extension spaces. We note that not all extensions in the cluster category give rise to extensions for the Jacobian algebra.
Highlights
Cluster algebras were introduced by Fomin and Zelevinsky in 2002 in [18] in order to give an algebraic framework for the study of the canonical bases in Lie theory
In this paper we explicitly describe such extensions for a class of string algebras, namely gentle algebras associated to surface triangulations
There is a class of cluster algebras coming from surfaces [16,17] where this process is encoded in the combinatorial geometry of surface triangulations
Summary
Cluster algebras were introduced by Fomin and Zelevinsky in 2002 in [18] in order to give an algebraic framework for the study of the (dual) canonical bases in Lie theory. Cases, the number of crossings of two arcs still gives rise to a dimension formula of the extension space between the corresponding indecomposable modules in the Jacobian algebra by explicitly constructing a basis. In [42] it is shown that the dimension of the extension space of two string objects in the cluster category is equal to the number of crossings of the corresponding arcs. That there must be a non-zero extension ExtC(γ2, γ1) corresponding in some way to this crossing follows from the 2-Calabi Yau property of C(S, M) and from the result in [42] giving the dimension of the extension space in terms of the number of crossing of the arcs.
Sign-in/Register to view highlights & summary Sign-in/Register to access full text options 
Free) 
Talk to us
Join us for a 30 min session where you can share your feedback and ask us any queries you have
Schedule a call
