Schofield sequences in the Euclidean case

Abstract

Let k be a field and consider the path algebra kQ of the quiver Q. A pair of indecomposable kQ-modules (Y,X) is called an orthogonal exceptional pair if the modules are exceptional and Hom(X,Y)=Hom(Y,X)=Ext1(X,Y)=0. Denote by F(X,Y) the full subcategory of objects having filtration with factors X and Y. By the theorem of Schofield if Z is exceptional but not simple, then Z∈F(X,Y) for some orthogonal exceptional pair (Y,X), and Z is not a simple object in F(X,Y). In fact, there are precisely s(Z)-1 such pairs, where s(Z) is the support of Z (i.e the number of nonzero components in Z). Whereas it is easy to construct Z given X and Y, there is no convenient procedure yet to determine the possible modules X (called Schofield submodules of Z) and then Y (called Schofield factors of Z), when Z is given. We present such an explicit procedure in the tame case, i.e when Q is Euclidean.