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http://dx.doi.org/10.5666/KMJ.2011.51.1.059

Degenerate Weakly (k1, k2)-Quasiregular Mappings  

Gao, Hongya (College of Mathematics and Computer, Hebei University)
Tian, Dazeng (College of Physical Science and Technology, Hebei University)
Sun, Lanxiang (Teachers College)
Chu, Yuming (Faculty of Science, Huzhou Teachers College)
Publication Information
Kyungpook Mathematical Journal / v.51, no.1, 2011 , pp. 59-68 More about this Journal
Abstract
In this paper, we first give the definition of degenerate weakly ($k_1$, $k_2$-quasiregular mappings by using the technique of exterior power and exterior differential forms, and then, by using Hodge decomposition and Reverse H$\"{o}$lder inequality, we obtain the higher integrability result: for any $q_1$ satisfying 0 < $k_1({n \atop l})^{3/2}n^{l/2}\;{\times}\;2^{n+1}l\;{\times}\;100^{n^2}\;\[2^l(2^{n+3l}+1)\]\;(l-q_1)$ < 1 there exists an integrable exponent $p_1$ = $p_1$(n, l, $k_1$, $k_2$) > l, such that every degenerate weakly ($k_1$, $k_2$)-quasiregular mapping f ${\in}$ $W_{loc}^{1,q_1}$ (${\Omega}$, $R^n$) belongs to $W_{loc}^{1,p_1}$ (${\Omega}$, $R^m$), that is, f is a degenerate ($k_1$, $k_2$)-quasiregular mapping in the usual sense.
Keywords
Degenerate weakly ($k_1$, $k_2$)-quasiregular mapping; exterior power; Hodge decomposition; Reverse H$\"{o}$lder inequality;
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