English

Hyperinstantons, the Beltrami Equation, and Triholomorphic Maps

High Energy Physics - Theory 2016-12-21 v1

Abstract

We consider the Beltrami equation for hydrodynamics and we show that its solutions can be viewed as instanton solutions of a more general system of equations. The latter are the equations of motion for an N=2{\cal N}=2 sigma model on 4-dimensional worldvolume (which is taken locally HyperK\"ahler) with a 4-dimensional HyperK\"ahler target space. By means of the 4D twisting procedure originally introduced by Witten for gauge theories and later generalized to 4D sigma-models by Anselmi and Fr\'e, we show that the equations of motion describe triholomophic maps between the worldvolume and the target space. Therefore, the classification of the solutions to the 3-dimensional Beltrami equation can be performed by counting the triholomorphic maps. The counting is easily obtained by using several discrete symmetries. Finally, the similarity with holomorphic maps for N=2{\cal N}=2 sigma on Calabi-Yau space prompts us to reformulate the problem of the enumeration of triholomorphic maps in terms of a topological sigma model.

Keywords

Cite

@article{arxiv.1509.09056,
  title  = {Hyperinstantons, the Beltrami Equation, and Triholomorphic Maps},
  author = {P. Fré and P. A. Grassi and A. S. Sorin},
  journal= {arXiv preprint arXiv:1509.09056},
  year   = {2016}
}

Comments

45 pages, Latex2e, 4 figures

R2 v1 2026-06-22T11:08:54.580Z