English

On Rad\'o's theorem for polyanalytic functions

Complex Variables 2021-01-21 v1

Abstract

We prove versions of Rad\'o's theorem for polyanalytic functions in one variable and also on simply connected C\mathbb{C}-convex domains in Cn\mathbb{C}^n. Let ΩC\Omega\subset \mathbb{C} be a bounded, simply connected domain and let qZ+.q\in \mathbb{Z}_+. Suppose at least one of the following conditions holds true: (i) gCq(Ω).g\in C^{q}(\Omega). (ii) gCκ(Ω),g\in C^\kappa(\Omega), for κ=min{1,q1},\kappa=\min\{1,q-1\}, such that gg is qq-analytic on Ωg1(0)\Omega\setminus g^{-1}(0) and such that Regg (Imgg respectively) is a solutions to the pp'-Laplace equation (pp''-Laplace equation respectively) on Ωg1(0)\Omega\setminus g^{-1}(0), for some p,p>1p',p''>1. Then gg agrees (Lebesgue) a.e.\ with a function that is qq-analytic on Ω.\Omega. In the process we give a simple proof of the fact that: If fCq(Ω)f\in C^q(\Omega) is qq-analytic on Ωf1(0)\Omega\setminus f^{-1}(0) then ff is qq-analytic on Ω.\Omega. The extensions of the results to several complex variables are straightforward using known techniques.

Keywords

Cite

@article{arxiv.2101.07874,
  title  = {On Rad\'o's theorem for polyanalytic functions},
  author = {Abtin Daghighi},
  journal= {arXiv preprint arXiv:2101.07874},
  year   = {2021}
}
R2 v1 2026-06-23T22:19:59.583Z