Categorical and K-theoretic Hall algebras for quivers with potential

Abstract

Given a quiver with potential (Q,W), Kontsevich-Soibelman constructed a Hall algebra on the critical cohomology of the stack of representations of (Q,W). Special cases of this construction are related to work of Nakajima, Varagnolo, Schiffmann-Vasserot, Maulik-Okounkov, Yang-Zhao etc. about geometric constructions of Yangians and their representations; indeed, given a quiver Q, there exists an associated pair (Q,W) whose CoHA is conjecturally the positive half of the Maulik-Okounkov Yangian YMO(gQ). For a quiver with potential (Q,W), we follow a suggestion of Kontsevich-Soibelman and study a categorification of the above algebra constructed using categories of singularities. Its Grothendieck group is a K-theoretic Hall algebra (KHA) for quivers with potential. We construct representations using framed quivers and we prove a wall-crossing theorem for KHAs. We expect the KHA for (Q,W) to recover the positive part of quantum affine algebra Uq(gQ) defined by Okounkov-Smirnov.