临界 p$p$ 双谐波问题的多重性结果

Pub Date : 2024-08-29 DOI:10.1002/mana.202300535

Said El Manouni, Kanishka Perera

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引用次数: 0

摘要

我们为有界域中的一些临界增长-双谐波问题证明了新的多重性结果。更具体地说，我们证明了这里所考虑的每个问题在某个参数 . 的所有足够大的值下都有任意多的解。特别是，解的数量随着 .我们还给出了一个明确的下限，即要有给定数量的解，就必须有下限。这个下界将以相关特征值问题的无界特征值序列来表示。即使在半线性问题中，我们的多重性结果也是全新的。证明基于抽象临界点定理。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Multiplicity results for critical p $p$ -biharmonic problems

We prove new multiplicity results for some critical growth $p$ -biharmonic problems in bounded domains. More specifically, we show that each of the problems considered here has arbitrarily many solutions for all sufficiently large values of a certain parameter $λ > 0$ . In particular, the number of solutions goes to infinity as $λ \to \infty$ . We also give an explicit lower bound on $λ$ in order to have a given number of solutions. This lower bound will be in terms of an unbounded sequence of eigenvalues of a related eigenvalue problem. Our multiplicity results are new even in the semilinear case $p = 2$ . The proofs are based on an abstract critical point theorem.

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