Canonical bases arising from quantum symmetric pairs of Kac-Moody type

Abstract

For quantum symmetric pairs (U, U) of Kac-Moody type, we construct bases for the highest weight integrable U-modules and their tensor products regarded as U-modules, as well as an basis for the modified form of the group U. A key new ingredient is a family of explicit elements called powers, which are shown to generate the integral form of U. We prove a conjecture of Balagovic-Kolb, removing a major technical assumption in the theory of quantum symmetric pairs. Even for quantum symmetric pairs of finite type, our new approach simplifies and strengthens the integrality of quasi-K-matrix and the constructions of bases, by avoiding a case-by-case rank one analysis and removing the strong constraints on the parameters in a previous work.