Giovany M. Figueiredo, Humberto Ramos Quoirin, Kaye Silva
Published 2020-11-15Version 1
Given a reflexive Banach space $X$, we consider a class of functionals $\Phi \in C^1(X,\Re)$ that do not behave in a uniform way, in the sense that the map $t \mapsto \Phi(tu)$, $t>0$, does not have a uniform geometry with respect to $u\in X$. Assuming instead such a uniform behavior within an open cone $Y \subset X \setminus \{0\}$, we show that $\Phi$ has a ground state relative to $Y$. Some further conditions ensure that this relative ground state is the (absolute) ground state of $\Phi$. Several applications to elliptic equations and systems are given.
Regularity versus singularities for elliptic problems in two dimensions
The Calderón-Zygmund theory for elliptic problems with measure data
An interpolation approach to $L^{\infty}$ a priori estimates for elliptic problems with nonlinearity on the boundary
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