一类具Hardy-Sobolev临界增长拟线性椭圆方程的径向解
Radial solutions for a quasilinear elliptic equation with a crittical Hardy-Sobolev growth
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摘要: 考虑一类具有临界Hardy-Sobolev指数的p-Laplace拟线性椭圆方程及其扰动问题的径向解的存在性,通过Lions引理和非线性泛函理论知识建立Sobolev空间到加权Lebesgue空间的紧嵌入定理,并利用极小化方法,得到了上述问题在全空间和有界区域上的径向解的存在性。Abstract: In this paper, the existence of radial solutions of p-Laplace quasilinear elliptic equations with critical Hardy-Sobolev exponents and perturbation problems are considered. A compact embedding theorem from Sobolev space to weighted Lebesgue space is established by means of Lions lemma and nonlinear functional theory. The existence of radial solutions in the whole space and bounded region is obtained.