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arxiv: 0811.1542 · v2 · submitted 2008-11-10 · 🧮 math.AP · math.SP

Precise asymptotic of eigenvalues of resonant quasilinear systems

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keywords alphabetaeigenvaluesresonantasymptoticcouplingdependingdepends
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In this work we study the sequence of variational eigenvalues of a system of resonant type involving $p-$ and $q-$laplacians on $\Omega \subset \R^N$, with a coupling term depending on two parameters $\alpha$ and $\beta$ satisfying $\alpha/p + \beta/q = 1$. We show that the order of growth of the $k^{th}$ eigenvalue depends on $\alpha+\beta$, $\lam_k = O(k^{\frac{\alpha+\beta}{N}})$.

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