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

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 \cite{majid1}. As an application, the type-crossing construction for the exceptional quantum groups of types $F_{4}$, $G_{2}$ 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 $U_q(\mathfrak{sl}_2)$ 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.