English

Horizontal $\alpha$-Harmonic Maps

Analysis of PDEs 2016-04-20 v1 Differential Geometry

Abstract

Given a C1C^1 planes distribution PTP_T on all Rm{\mathbb R}^m we consider {\em horizontal α\alpha-harmonic maps}, α1/2\alpha\ge 1/2, with respect to such a distribution. These are maps uHα(Rk,Rm)u\in H^{\alpha}({{\mathbb R}}^k,{{\mathbb R}}^m) satisfying PTu=uP_T\nabla u=\nabla u and PT(u)(Δ)αu=0P_T(u)(-\Delta)^{\alpha}u=0 in D(Rk).{\mathcal D}'({{\mathbb R}}^k). If the distribution of planes is integrable then we recover the classical case of α\alpha-harmonic maps with values into a manifold. In this paper we shall focus our attention to the case α=1/2\alpha=1/2 in dimension 11 and α=2\alpha=2 in dimension 22 and we investigate the regularity of the {\em horizontal α\alpha-harmonic maps}. In both cases we show that such maps satisfy a Schr\"odinger type system with an antisymmetric potential, that permits us to apply the previous results obtained by the authors. Finally we study the regularity of {\em variational α\alpha-harmonic} maps which are critical points of (Δ)α/2uL22\|(-\Delta)^{\alpha/2} u\|^2_{L^2} under the constraint to be tangent (horizontal) to a given planes distribution. We produce a convexification of this variational problem which permits to write it's Euler Lagrange equations.

Keywords

Cite

@article{arxiv.1604.05461,
  title  = {Horizontal $\alpha$-Harmonic Maps},
  author = {Francesca Da Lio and Tristan Rivière},
  journal= {arXiv preprint arXiv:1604.05461},
  year   = {2016}
}
R2 v1 2026-06-22T13:35:34.572Z