Minimal generators of Hall algebras of 1-cyclic perfect complexes

Abstract

Let A be the path algebra of a Dynkin quiver over a finite field, and let C1(P) be the category of 1-cyclic complexes of projective A-modules. In the present paper, we give a PBW-basis and a minimal set of generators for the Hall algebra (C1(P)) of C1(P). Using this PBW-basis, we firstly prove the degenerate Hall algebra of C1(P) is the universal enveloping algebra of the Lie algebra spanned by all indecomposable objects. Secondly, we calculate the relations in the generators in (C1(P)), and obtain quantum Serre relations in a quotient of certain twisted version of (C1(P)). Moreover, we establish relations between the degenerate Hall algebra, twisted Hall algebra of A and those of C1(P), respectively.