Hall algebras and quantum symmetric pairs I: foundations

Abstract

A quantum symmetric pair consists of a quantum group U and its coideal subalgebra U with parameters (called an group). We initiate a Hall algebra approach for the categorification of groups. A universal group U is introduced and U is recovered by a central reduction of U. The semi-derived Ringel-Hall algebras of the first author and Peng, which are closely related to semi-derived Hall algebras of Gorsky and motivated by Bridgeland's work, are extended to the setting of 1-Gorenstein algebras, as shown in Appendix A by the first author. A new class of 1-Gorenstein algebras (called algebras) arising from acyclic quivers with involutions is introduced. The semi-derived Ringel-Hall algebras for the Dynkin algebras are shown to be isomorphic to the universal quasi-split groups of finite type. Monomial bases and PBW bases for these Hall algebras and groups are constructed.