Évènements

Let $varOmega$ be a domain in ${mathbb R}^n$ with $ngeq 2$ and $0in varOmega$. We study anisotropic elliptic equations such as $-sum_{i=1}^n,partial_{x_i} (|partial_{x_i} u|^{p_i-2}partial_{x_i} u)=delta_0$ in $varOmega$ (with Dirac mass $delta_0$ at zero), subject to $u=0$ on $partialvarOmega$. We assume that all $p_i$ are in $(1,infty)$ with their harmonic mean $p$ satisfying either Case 1: $p < n$ and $max_{1leq ileq n}{p_i}<frac{p(n-1)}{n-p}$ or Case 2: $p=n$ and $varOmega$ is bounded. We introduce a suitable notion of fundamental solution and establish its existence, together with sharp pointwise upper bound estimates near the origin for the solution and its derivatives. The latter is based on a Moser-type iteration scheme specific to each case, which is intricate due to our anisotropic analogue of the reverse H"older inequality. This is joint work with Jérôme Vétois (University of Nice)."

Dans un travail mené avec G. Pacienza nous montrons la terminaison d’un log-MMP quelconque pour une variété symplectique irréductible projective. Ce résultat est une généralisation de travaux de Matsushita et Nakamura et utilise un critère de Shokurov. Si le temps le permet nous allons discuter quelques applications possibles.