Solvability of Dirac type equations
Abstract
This paper develops a weighted -method for the (half) Dirac equation. For Dirac bundles over closed Riemann surfaces, we give a sufficient condition for the solvability of the (half) Dirac equation in terms of a curvature integral. Applying this to the Dolbeault-Dirac operator, we establish an automatic transversality criteria for holomorphic curves in K\"ahler manifolds. On compact Riemannian manifolds, we give a new perspective on some well-known results about the first eigenvalue of the Dirac operator, and improve the estimates when the Dirac bundle has a -grading. On Riemannian manifolds with cylindrical ends, we obtain solvability in the -space with suitable exponential weights while allowing mild negativity of the curvature.
Cite
@article{arxiv.1407.6936,
title = {Solvability of Dirac type equations},
author = {Qingchun Ji and Ke Zhu},
journal= {arXiv preprint arXiv:1407.6936},
year = {2016}
}
Comments
Add application of transversality of holomorphic curves in K\"ahler manifolds. Improved exposition. 23 pages