Multiplicity results for elliptic problems with critical exponential growth

Kanishka Perera
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Abstract

We prove new multiplicity results for some elliptic problems with critical exponential growth. More specifically, we show that the problems considered here have arbitrarily many solutions for all sufficiently large values of a certain parameter \(\mu > 0\). In particular, the number of solutions goes to infinity as \(\mu \rightarrow \infty \). The proof is based on an abstract critical point theorem.

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具有临界指数增长的椭圆问题的多重性结果
我们为一些具有临界指数增长的椭圆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问题对于某个参数的所有足够大的值都有任意多的解。特别是,解的数量会随着 \(\mu \rightarrow \infty \)的变化而达到无穷大。证明基于一个抽象临界点定理。
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