English

Gradient forms and strong solidity of free quantum groups

Operator Algebras 2020-10-21 v4 Quantum Algebra

Abstract

Consider the free orthogonal quantum groups ON+(F)O_N^+(F) and free unitary quantum groups UN+(F)U_N^+(F) with N3N \geq 3. In the case F=idNF = {\rm id}_N it was proved both by Isono and Fima-Vergnioux that the associated finite von Neumann algebra L(ON+)L_\infty(O_N^+) is strongly solid. Moreover, Isono obtains strong solidity also for L(UN+)L_\infty(U_N^+) . In this paper we prove for general FGLN(C)F \in GL_N(\mathbb{C}) that the von Neumann algebras L(ON+(F))L_\infty(O_N^+(F)) and L(UN+(F))L_\infty(U_N^+(F)) are strongly solid. A crucial part in our proof is the study of coarse properties of gradient bimodules associated with Dirichlet forms on these algebras and constructions of derivations due to Cipriani--Sauvageot.

Keywords

Cite

@article{arxiv.1802.01968,
  title  = {Gradient forms and strong solidity of free quantum groups},
  author = {Martijn Caspers},
  journal= {arXiv preprint arXiv:1802.01968},
  year   = {2020}
}

Comments

Accepted for Mathematische Annalen

R2 v1 2026-06-23T00:12:58.764Z