algebras and groups

Abstract

We survey some recent development on the theory of algebras. Starting from (aka quivers with involutions), we construct a class of 1-Gorenstein algebras called algebras, whose semi-derived Hall algebras give us algebras. We then use these algebras to realize quasi-split groups arising from quantum symmetric pairs. Relative braid group symmetries on groups are realized via reflection functors. In case of Jordan , the algebra is commutative and connections to -Littlewood symmetric functions are developed. In case of of diagonal type, our construction amounts to a reformulation of Bridgeland-Hall algebra realization of the Drinfeld double quantum groups (which in turn generalizes Ringel-Hall algebra realization of halves of quantum groups). Many rank 1 and rank 2 computations are supplied to illustrate the general constructions. We also briefly review algebras of weighted projective lines, and use them to realize Drinfeld type presentations of loop algebras.