Adams' inequality with exact growth in the hyperbolic space H4 and Lions lemma
Abstract
In this article we prove Adams inequality with exact growth condition in the four dimensional hyperbolic space H4, align ∫H4 e32 π2 u2 - 1(1 + |u|)2 \ dvg ≤ C ||u||2L2(H4). align for all u ∈ C∞c(H4) with ∫H4 (P2 u) u \ dvg ≤ 1. We will also establish an Adachi-Tanaka type inequality in this settings. Another aspect of this article is the P.L.Lions lemma in the hyperbolic space. We prove P.L.Lions lemma for the Moser functional and for a few cases of the Adams functional on the whole hyperbolic space.
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