Multi-calorons and their moduli
Abstract
Pure Yang-Mills instantons are considered on S^1 x R^3 -- so-called calorons. The holonomy -- or Polyakov loop around the thermal S^1 at spatial infinity -- is assumed to be a non-centre element of the gauge group SU(n) as most appropriate for QCD applications in the confined phase. It is shown that a charge k caloron can be seen as a collection of nk massive magnetic monopoles each carrying fractional topological charge. This interpretation offers a physically appealing way of introducing monopole degrees of freedom into pure gluodynamics: as constituents of finite temperature instantons. New and exact solutions are found along with the fermionic zero-modes of the Dirac operator. The properties of the zero-modes are analysed as well as the hyperkahler and twistor geometry of the caloron moduli space. Lattice gauge theoretic applications are also mentioned.
Cite
@article{arxiv.hep-th/0511125,
title = {Multi-calorons and their moduli},
author = {Daniel Nogradi},
journal= {arXiv preprint arXiv:hep-th/0511125},
year = {2007}
}
Comments
PhD thesis, 109 pages, 24 figures