Local wellposedness for the 2+1 dimensional monopole equation

Magdalena Czubak

Local wellposedness for the 2+1 dimensional monopole equation

Analysis of PDEs 2009-02-10 v2

Authors: Magdalena Czubak

Abstract

The space-time monopole equation on $\R^{2+1}$ can be derived by a dimensional reduction of the anti-self-dual Yang Mills equations on $\R^{2+2}$ . It can be also viewed as the hyperbolic analog of Bogomolny equations. We uncover null forms in the nonlinearities and employ optimal bilinear estimates in the framework of Wave-Sobolev spaces. As a result, we show the equation is locally wellposed in the Coulomb gauge for initial data sufficiently small in $H^s$ for $s>{1/4}$ .

Keywords

well-posedness sobolev regularity of partial differential equations local-global principles

Cite

@article{arxiv.0712.1393,
  title  = {Local wellposedness for the 2+1 dimensional monopole equation},
  author = {Magdalena Czubak},
  journal= {arXiv preprint arXiv:0712.1393},
  year   = {2009}
}

Comments

23 pages; Added some remarks, and rewrote parts of Sections 4 and 5; Submitted

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