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Critical points of the Moser-Trudinger functional

arXiv:1108.5576

Abstract

On a smooth bounded 2-dimensional domain $Ω$ we study the heat flow $u_t=Δu +λ(t)ue^{u^2}$ ($λ(t)$ is such that $d/dt ||u(t,\cdot)||_{H^1_0}=0$) introduced by T. Lamm, F. Robert and M. Struwe to investigate the Moser-Trudinger functional $E(v)=\int_Ω (e^{v^2}-1)dx, v\in H^1_0(Ω).$ We prove that if $u$ blows-up as $t\to\infty$ and if $E(u(t,\cdot))$ remains bounded, then for a sequence $t_k\to\infty$ we have $u(t_k,\cdot)\rightharpoonup 0$ in $H^1_0$ and $\|u(t_k,\cdot)\|_{H^1_0}^2\to 4πL$ for an integer $L\ge 1$. We couple these results with a topological technique to prove that if $Ω$ is not contractible, then for every $0<Λ\in \mathbb{R} \setminus 4 π\mathbb{N}$ the functional $E$ constrained to $M_Λ=\{v\in H^1_0(Ω):||v||_{H^1_0}^2=Λ\}$ has a positive critical point. We prove that when $Ω$ is the unit ball and $Λ$ is large enough, then $E|_{M_Λ}$ has no positive critical points, hence showing that the topological assumption on $Ω$ is natural.

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