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Boundary limits for bounded quasiregular mappings

Complex Variables 2007-05-23 v1

Abstract

In this paper we establish results on the existence of nontangential limits for weighted \CalA\Cal A-harmonic functions in the weighted Sobolev space Ww1,q(Bn)W_w^{1,q}(\Bbb B^n), for some q>1q>1 and ww in the Muckenhoupt AqA_q class, where Bn\Bbb B^n is the unit ball in Rn\Bbb R^n. These results generalize the ones in section \S3 of [KMV], where the weight was identically equal to one. Weighted \CalA\Cal A-harmonic functions are weak solutions of the partial differential equation div(\CalA(x,u))=0,\text{div}(\Cal A(x,\nabla u))=0, where αw(x)ξq<\CalA(x,ξ),ξ>βw(x)ξq\alpha w(x) |\xi|^{q} \le < \Cal A(x,\xi),\xi >\le \beta w(x) |\xi|^{q} for some fixed q(1,)q\in (1,\infty), where 0<αβ<0<\alpha\leq \beta<\infty, and w(x)w(x) is a qq-admissible weight as in Chapter 1 in [HKM]. Later, we apply these results to improve on results of Koskela, Manfredi and Villamor [KMV] and Martio and Srebro [MS] on the existence of radial limits for bounded quasiregular mappings in the unit ball of Rn\Bbb R^n with some growth restriction on their multiplicity function.

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Cite

@article{arxiv.math/0507540,
  title  = {Boundary limits for bounded quasiregular mappings},
  author = {Bao Qin Li and Enrique Villamor},
  journal= {arXiv preprint arXiv:math/0507540},
  year   = {2007}
}

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18 pages