Noncommutative instantons from twisted conformal symmetries
Abstract
We construct a five-parameter family of gauge-nonequivalent SU(2) instantons on a noncommutative four sphere and of topological charge equal to -1. These instantons are critical points of a gauge functional and satisfy self-duality equations with respect to a Hodge star operator on forms on . They are obtained by acting with a twisted conformal symmetry on a basic instanton canonically associated with a noncommutative instanton bundle on the sphere. A completeness argument for this family is obtained by means of index theorems. The dimension of the ``tangent space'' to the moduli space is computed as the index of a twisted Dirac operator and turns out to be equal to five, a number that survives deformation.
Cite
@article{arxiv.math/0601554,
title = {Noncommutative instantons from twisted conformal symmetries},
author = {Giovanni Landi and Walter D. van Suijlekom},
journal= {arXiv preprint arXiv:math/0601554},
year = {2008}
}
Comments
47 pages. Latex. v3; major changes, parts rewritten. Published in CMP