Braid group action on quantum virtual Grothendieck ring through constructing presentations

Abstract

As a continuation of JLO1, we investigate the quantum virtual Grothendieck ring q() associated with a finite dimensional simple Lie algebra , especially of non-simply-laced type. We establish an isomorphism Q between the heart subring q,Q() of q() associated with a Dynkin quiver Q of type and the unipotent quantum coordinate algebra q() of type . This isomorphism and the categorification theory via quiver Hecke algebras enable us to obtain a presentation of q(), which reveals that q() can be understood as a boson-extension of q(). Then we show that the automorphisms, arising from the reflections on Dynkin quivers and the isomorphisms Q, preserve the canonical basis q of q(). Finally, we prove that such automorphisms produce a braid group B action on q().