English

On double quantum affinization: 1. Type $\mathfrak a_1$

Quantum Algebra 2019-03-04 v1 Representation Theory

Abstract

We define the double quantum affinization U¨q(a1)\ddot{\mathrm{U}}_q(\mathfrak a_1) of type a1\mathfrak{a}_1 as a topological Hopf algebra. We prove that it admits a subalgebra U¨q(a1)\ddot{\mathrm{U}}_q'(\mathfrak a_1) whose completion is (bicontinuously) isomorphic to the completion of the quantum toroidal algebra U˙q(a˙1)\dot{\mathrm{U}}_q(\dot{\mathfrak a}_1), defined as the (simple) quantum affinization of the untwisted affine Kac-Moody Lie algebra sl˙2\dot{\mathfrak{sl}}_2 of type a˙1\dot{\mathfrak a}_1, equipped with a certain topology inherited from its natural Z\mathbb Z-grading. The isomorphism is constructed by means of a bicontinuous action by automorphisms of an affinized version B¨\ddot{\mathfrak B} -- technically a split extension B¨B˙P\ddot{\mathfrak B} \cong \dot{\mathfrak B} \ltimes P^\vee by the coweight lattice PP^\vee -- of the affine braid group B˙\dot{\mathfrak B} of type a˙1\dot{\mathfrak a}_1 on that completion of U˙q(a˙1)\dot{\mathrm{U}}_q(\dot{\mathfrak a}_1). It can be regarded as an affinized version of the Damiani-Beck isomorphism, familiar from the quantum affine setting. We eventually prove the corresponding triangular decomposition of U¨q(a1)\ddot{\mathrm{U}}_q(\mathfrak a_1) and briefly discuss the consequences regarding the representation theory of quantum toroidal algebras.

Keywords

Cite

@article{arxiv.1903.00418,
  title  = {On double quantum affinization: 1. Type $\mathfrak a_1$},
  author = {Elie Mounzer and Robin Zegers},
  journal= {arXiv preprint arXiv:1903.00418},
  year   = {2019}
}

Comments

40 pages

R2 v1 2026-06-23T07:55:39.385Z