Multiple solutions of degenerate perturbed elliptic problems involving a subcritical Sobolev exponent
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Degenerate elliptic problem, weighted Sobolev space, unbounded domain, perturbation, multiple solutionsAbstrakt
We study the degenerate elliptic equation $$ -\text{\rm div}(a(x)\nabla u)+b(x)u= K(x)\vert u\vert ^{p-2}u+g(x)\quad \text{\rm in } \mathbb R^{N}, $$ where $N\geq 2$ and $2< p< 2^{*}$. We assume that $a\not\equiv 0$ is a continuous, bounded and nonnegative function, while $b$ and $K$ are positive and essentially bounded in $\mathbb R^{N}$. Under some assumptions on $a$, $b$ and $K$, which control the location of zeros of $a$ and the behaviour of $a$, $b$ and $K$ at infinity we prove that if the perturbation $g$ is sufficiently small then the above problem has at least two distinct solutions in an appropriate weighted Sobolev space. The proof relies essentially on the Ekeland Variational Principle [< i> Nonconvex minimization problems< /i> , Bull. Amer. Math. Soc. < b> 1< /b> (1979), 443–473] and on the Mountain Pass Theorem without the Palais-Smale condition, established in Brezis-Nirenberg [< i> Positive solutions of nonlinear elliptic equations involving critical Sobolev exponent< /i> , Comm. Pure Appl. Math. < b> 36< /b> (1983), 437–477], combined with a weighted variant of the Brezis-Lieb Lemma [< i> A relation between pointwise convergence of functions and convergence of functionals< /i> , Proc. Amer. Math. Soc. < b> 88< /b> (1983), 486–490], in order to overcome the lack of compactness.Pobrania
Opublikowane
2000-06-01
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1.
CÎRSTEA, Florica Şt. & RĂDULESCU, Vicenţiu D. Multiple solutions of degenerate perturbed elliptic problems involving a subcritical Sobolev exponent. Topological Methods in Nonlinear Analysis [online]. 1 czerwiec 2000, T. 15, nr 2, s. 283–300. [udostępniono 6.7.2025].
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