English

Difference Hierarchies for $nT$ $\tau$-Functions

Representation Theory 2018-05-21 v2

Abstract

We introduce hierarchies of difference equations (referred to as nTnT-systems) associated to the action of a (centrally extended, completed) infinite matrix group GL(n)GL_{\infty}^{(n)} on nn-component fermionic Fock space. The solutions are given by matrix elements (τ\tau-functions) for this action. We show that the τ\tau-functions of type nTnT satisfy bilinear equations of length 3,4,,n+13,4,\dots,n+1. The 2T2T-system is, after a change of variables, the usual 33 term TT-system of type AA. Restriction from GL(n)GL_{\infty}^{(n)} to a subgroup isomorphic to the loop group LGLnLGL_{n}, defines nQnQ-systems, studied earlier by the present authors for n=2,3n=2,3.

Cite

@article{arxiv.1611.10340,
  title  = {Difference Hierarchies for $nT$ $\tau$-Functions},
  author = {Darlayne Addabbo and Maarten Bergvelt},
  journal= {arXiv preprint arXiv:1611.10340},
  year   = {2018}
}

Comments

Current version generalizes results of previous version to the general $n$ case. Some sign errors have been corrected

R2 v1 2026-06-22T17:09:51.535Z