A note on the log-perturbed Br\'ezis-Nirenberg problem on the hyperbolic space
Abstract
We consider the log-perturbed Br\'ezis-Nirenberg problem on the hyperbolic space align* BNu+λ u +|u|p-1u+θ u u2 =0, \ \ \ \ u ∈ H1(BN), \ u > 0 \ in \ BN, align* and study the existence vs non-existence results. We show that whenever θ >0, there exists an H1-solution, while for θ <0, there does not exist a positive solution in a reasonably general class. Since the perturbation u u2 changes sign, Pohozaev type identities do not yield any non-existence results. The main contribution of this article is obtaining an "almost" precise lower asymptotic decay estimate on the positive solutions for θ <0, culminating in proving their non-existence assertion.
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