The fermion-boson map for large d
Abstract
We show that the three-dimensional map between fermions and bosons at finite temperature generalises for all odd dimensions . We further argue that such a map has a nontrivial large limit. Evidence comes from studying the gap equations, the free energies and the partition functions of the Gross-Neveu and CP models for odd in the presence of imaginary chemical potential. We find that the gap equations and the free energies can be written in terms of the Bloch-Wigner-Ramakrishnan functions analysed by Zagier. Since gives the volume of ideal tetrahedra in 3 hyperbolic space our three-dimensional results are related to resent studies of complex Chern-Simons theories, while for they yield corresponding higher dimensional generalizations. As a spinoff, we observe that particular complex saddles of the partition functions correspond to the zeros and the extrema of the Clausen functions with odd and even index respectively. These saddles lie on the unit circle at positions remarkably well approximated by a sequence of rational multiples of .
Cite
@article{arxiv.1803.05950,
title = {The fermion-boson map for large d},
author = {Evangelos G. Filothodoros and Anastasios C. Petkou and Nicholas D. Vlachos},
journal= {arXiv preprint arXiv:1803.05950},
year = {2019}
}
Comments
34 pages, 1 figure