Existence and regularity of extremal solutions for a mean-curvature   equation

Antoine Mellet; Julien Vovelle

arXiv:0904.0618·math.AP·April 15, 2010

Existence and regularity of extremal solutions for a mean-curvature equation

Antoine Mellet, Julien Vovelle

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Abstract

We study a class of mean curvature equations $- M u = H + λ u^{p}$ where $M$ denotes the mean curvature operator and for $p \geq 1$ . We show that there exists an extremal parameter $λ^{*}$ such that this equation admits a minimal weak solutions for all $λ \in [0, λ^{*}]$ , while no weak solutions exists for $λ > λ^{*}$ (weak solutions will be defined as critical points of a suitable functional). In the radially symmetric case, we then show that minimal weak solutions are classical solutions for all $λ \in [0, λ^{*}]$ and that another branch of classical solutions exists in a neighborhood $(λ_{*} - η, λ^{*})$ of $λ^{*}$ .

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