J-holomorphic curves and Dirac-harmonic maps
Abstract
Dirac-harmonic maps are critical points of a fermionic action functional, generalizing the Dirichlet energy for harmonic maps. We consider the case where the source manifold is a closed Riemann surface with the canonical Spin^c-structure determined by the complex structure and the target space is a Kaehler manifold. If the underlying map f is a J-holomorphic curve, we determine a space of spinors on the Riemann surface which form Dirac-harmonic maps together with f. For suitable complex structures on the target manifold the tangent bundle to the moduli space of J-holomorphic curves consists of Dirac-harmonic maps. We also discuss the relation to the A-model of topological string theory.
Cite
@article{arxiv.1908.02275,
title = {J-holomorphic curves and Dirac-harmonic maps},
author = {M. J. D. Hamilton},
journal= {arXiv preprint arXiv:1908.02275},
year = {2020}
}
Comments
21 pages; corrections and improvements; to appear in Differential Geom. Appl