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International School
“Singularities, Blow-up, and Non-Classical
Problems in Nonlinear PDEs for youth”
November 14, 2024 10:00–11:00, Moscow, RUDN University
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Boundary value problems for elliptic semi-linear equations with measure data
Moshe Marcus Technical University Technion, Israel
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Abstract:
We consider boundary value problems of the form
$-(\Delta + V )u + f(u) = \tau$ in $D\subset \mathbb R^N$, $\mathrm{tr}_V u = \nu$ on $\partial D$ where
$D$ is a bounded Lipschitz domain in $\mathbb R^N$ and $\mathrm{tr}_V u$ denotes the measure
boundary trace associated with $V$.
Regarding the non-linear term assume: $f$ is continuous, monotone increasing and $f(0) = 0$.
We discuss questions of existence and uniqueness, first in the case $V = 0$ and then for
potentials $V$ that blow up at the boundary not faster then $\mathrm{dist}(x; \partial D)^{-2}$.
Language: English
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