Venerdì 6 luglio 2018 alle ore 14:30, presso l' Aula A del Plesso di Matematica, il Professor Nicolas Saintier, del Departamento de Matemática, Universidad de Buenos Aires, Argentina, terrà un seminario di Analisi Matematica dal titolo: 

Existence results for nonlinear elliptic equations with measure valued absorption potential

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Organizzatori: Proff. Alessandra Lunardi e Giampiero Palatucci

Abstract

We study the semilinear elliptic equation $$-\Delta u + g(u)\sigma = \mu$$ with Dirichlet boundary condition in a smooth bounded domain where $\sigma$ is a nonnegative Radon measure, $\mu$ a Radon measure and $g$ is an absorbing nonlinearity. We show that the problem is well posed if we assume that $\sigma$ belongs to some Morrey class. Un-der this condition we give a general existence result for any bounded measure provided $g$ satisfies a subcritical integral assumption. We study also the supercritical case when $g(r)= \abs r^{q-1}r$, with $q>1$ and $\mu$ satisfies an absolute continuity condition expressed in terms of some capacities involving $\sigma$. This is a joint work with Laurent Veron (Univ. Tours - France).

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