Diagram automorphisms and canonical bases for quantized enveloping algebras

Abstract

Let U-q be the negative part of the quantized enveloping algebra associated to a Kac-Moody algebra g of symmetric type, and U-q the algebra corresponding to the orbit algebra gσ obtained from an admissible diagram automorphism σ on g. Lusztig consructed the canonical basis B of Uq- and the canonical signed basis B of Uq- by making use of the geometric theory of quivers. He proved that there is a natural bijection Bσ B. In this paper, assuming the existence of the canonical basis B of Uq-, we construct the canonical signed basis B of Uq-, and a natural bijection Bσ B by an elementary method.