English

Reshetnyak-class mappings and composition operators

Analysis of PDEs 2025-07-15 v1

Abstract

For the Reshetnyak-class homeomorphisms φ:ΩY\varphi:\Omega\to Y, where~Ω\Omega is a~domain in some Carnot group and~YY is a~metric space, we obtain an~equivalent description as the mappings which induce the bounded composition operator φ:Lip(Y)Lq1(Ω), \varphi^*:{\rm Lip}(Y)\to L_q^1(\Omega), where 1q1\leq q\leq \infty, as φu=uφ\varphi^*u=u\circ\varphi for uLip(Y)u\in{\rm Lip}(Y). We demonstrate the utility of our approach by characterizing the homeomorphisms φ:ΩΩ\varphi:\Omega\to\Omega' of domains in some Carnot group~G\mathbb G which induce the bounded composition operator φ:Lp1(Ω)Liploc(Ω)Lq1(Ω),1qp, \varphi^*: L^1_p(\Omega')\cap {\rm Lip}_{{\rm loc}}(\Omega')\to L^1_q (\Omega),\quad 1\leq q \leq p\leq \infty, of homogeneous Sobolev spaces. The new proof is much shorter than the one already available, requires a~minimum of tools, and enables us to obtain new properties of the homeomorphisms in question.

Keywords

Cite

@article{arxiv.2507.10254,
  title  = {Reshetnyak-class mappings and composition operators},
  author = {Pavlov S. V. and Vodopyanov S. K},
  journal= {arXiv preprint arXiv:2507.10254},
  year   = {2025}
}

Comments

23 pages, 19 references

R2 v1 2026-07-01T03:59:49.990Z