English

Quasiregular curves

Complex Variables 2020-05-05 v2 Differential Geometry Symplectic Geometry

Abstract

We extend the notion of a pseudoholomorphic vector of Iwaniec, Verchota, and Vogel to mappings between Riemannian manifolds. Since this class of mappings contains both quasiregular mappings and (pseudo)holomorphic curves, we call them quasiregular curves. Let nmn\le m and let MM be an oriented Riemannian nn-manifold, NN a Riemannian mm-manifold, and ωΩn(N)\omega \in \Omega^n(N) a smooth closed non-vanishing nn-form on NN. A continuous Sobolev map f ⁣:MNf\colon M \to N in Wloc1,n(M,N)W^{1,n}_{\mathrm{loc}}(M,N) is a KK-quasiregular ω\omega-curve for K1K\ge 1 if ff satisfies the distortion inequality (ωf)DfnK(fω)(\lVert\omega\rVert\circ f)\lVert Df\rVert^n \le K (\star f^* \omega) almost everywhere in MM. We prove that quasiregular curves satisfy Gromov's quasiminimality condition and a version of Liouville's theorem stating that bounded quasiregular curves RnRm\mathbb R^n \to \mathbb R^m are constant. We also prove a limit theorem that a locally uniform limit f ⁣:MNf\colon M \to N of KK-quasiregular ω\omega-curves (fj ⁣:MN)(f_j \colon M\to N) is also a KK-quasiregular ω\omega-curve. We also show that a non-constant quasiregular ω\omega-curve f ⁣:MNf\colon M \to N is discrete and satisfies fω>0\star f^*\omega >0 almost everywhere, if one of the following additional conditions hold: the form ω\omega is simple or the map ff is C1C^1-smooth.

Keywords

Cite

@article{arxiv.1909.08221,
  title  = {Quasiregular curves},
  author = {Pekka Pankka},
  journal= {arXiv preprint arXiv:1909.08221},
  year   = {2020}
}
R2 v1 2026-06-23T11:18:46.998Z