Double-bosonization and Majid's Conjecture, (IV): Type-Crossings from A to BCD

Abstract

Both in Majid's double-bosonization theory and in Rosso's quantum shuffle theory, the rank-inductive and type-crossing construction for Uq( g)'s is still a remaining open question. In this paper, working with Majid's framework, based on our generalized double-bosonization Theorem proved in HH2, we further describe explicitly the type-crossing construction of Uq( g)'s for (BCD)n series direct from type An-1 via adding a pair of dual braided groups determined by a pair of (R, R')-matrices of type A derived from the respective suitably chosen representations. %which generalize the lower rank cases constructed in HH1. Combining with our work in HH1,HH2,HH3, this solves Majid's conjecture, that is, any quantum group Uq( g) associated to a simple Lie algebra g can be grown out of Uq( sl2) inductively by a series of suitably chosen double-bosonization procedures.