English

Using a $q$-shuffle algebra to describe the basic module $V(\Lambda_0)$ for the quantized enveloping algebra $U_q(\widehat{\mathfrak{sl}}_2)$

Quantum Algebra 2024-08-22 v1 Combinatorics

Abstract

We consider the quantized enveloping algebra Uq(sl^2)U_q(\widehat{\mathfrak{sl}}_2) and its basic module V(Λ0)V(\Lambda_0). This module is infinite-dimensional, irreducible, integrable, and highest-weight. We describe V(Λ0)V(\Lambda_0) using a qq-shuffle algebra in the following way. Start with the free associative algebra V\mathbb V on two generators x,yx,y. The standard basis for V\mathbb V consists of the words in x,yx,y. In 1995 M. Rosso introduced an associative algebra structure on V\mathbb V, called a qq-shuffle algebra. For u,v{x,y}u,v\in \lbrace x,y\rbrace their qq-shuffle product is uv=uv+q(u,v)vuu\star v = uv+q^{(u,v)}vu, where (u,v)=2( u,v) =2 (resp. (u,v)=2(u,v) =-2) if u=vu=v (resp. uvu\not=v). Let U\mathbb U denote the subalgebra of the qq-shuffle algebra V\mathbb V that is generated by x,yx, y. Rosso showed that the algebra U\mathbb U is isomorphic to the positive part of Uq(sl^2)U_q(\widehat{\mathfrak{sl}}_2). In our first main result, we turn U\mathbb U into a Uq(sl^2)U_q(\widehat{\mathfrak{sl}}_2)-module. Let U\bf U denote the Uq(sl^2)U_q(\widehat{\mathfrak{sl}}_2)-submodule of U\mathbb U generated by the empty word. In our second main result, we show that the Uq(sl^2)U_q(\widehat{\mathfrak{sl}}_2)-modules U\bf U and V(Λ0)V(\Lambda_0) are isomorphic. Let V\bf V denote the subspace of V\mathbb V spanned by the words that do not begin with yy or xxxx. In our third main result, we show that U=UV\bf U = \mathbb U \cap {\bf V}.

Keywords

Cite

@article{arxiv.2112.06085,
  title  = {Using a $q$-shuffle algebra to describe the basic module $V(\Lambda_0)$ for the quantized enveloping algebra $U_q(\widehat{\mathfrak{sl}}_2)$},
  author = {Paul Terwilliger},
  journal= {arXiv preprint arXiv:2112.06085},
  year   = {2024}
}

Comments

35 pages

R2 v1 2026-06-24T08:13:35.452Z