Double-bosonization and Majid's Conjecture, (II): cases of irregular R-matrices and type-crossings of F4, G2

Abstract

The purpose of the paper is to build up the related theory of weakly quasitriangular dual pairs suitably for non-standard R-matrices (irregular), and establish the generalized double-bosonization construction theorem for irregular R, which generalize Majid's results for regular R in majid1. As an application, the type-crossing construction for the exceptional quantum groups of types F4, G2 is obtained. This affirms the Majid's expectation that the tree structure of nodes diagram associated with quantum groups can be grown out of the node corresponding to Uq(sl2) by double-bosonization procedures. Notably from a representation perspective, we find an effective method to get the minimal polynomials for the non-standard R-matrices involved.