Simple Modules and PI Structure of the Two-Parameter Quantized Algebra U+r,s(B2)

Abstract

We study the two-parameter quantized enveloping algebra U+r,s(B2) at roots of unity and investigate its structure and representations. We first show that when r and s are roots of unity, the algebra becomes a PI algebra, and we compute its PI degree explicitly using De Concini-Procesi method. We construct and classify finite-dimensional simple modules for U+r,s(B2) by analyzing a subalgebra B⊂ U+r,s(B2). Simple modules are categorized into torsion-free and torsion types with respect to a distinguished normal element. We classify all torsion-free simple B-modules and lift them to U+r,s(B2). The remaining simple modules are constructed in the nilpotent case. This work provides a complete classification of simple U+r,s(B2)-modules at roots of unity and contributes to the understanding of two-parameter quantum groups in type B2.