On Rad\'o's theorem for polyanalytic functions

Abstract

We prove versions of Rad\'o's theorem for polyanalytic functions in one variable and also on simply connected C-convex domains in Cn. Let ⊂ C be a bounded, simply connected domain and let q∈ Z+. Suppose at least one of the following conditions holds true: (i) g∈ Cq(). (ii) g∈ C(), for =\1,q-1\, such that g is q-analytic on g-1(0) and such that Reg (Img respectively) is a solutions to the p'-Laplace equation (p''-Laplace equation respectively) on g-1(0), for some p',p''>1. Then g agrees (Lebesgue) a.e.\ with a function that is q-analytic on . In the process we give a simple proof of the fact that: If f∈ Cq() is q-analytic on f-1(0) then f is q-analytic on . The extensions of the results to several complex variables are straightforward using known techniques.

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