Lucas C. F. Ferreira, Marcelo Montenegro, Matheus C. Santos
Published 2013-07-24, updated 2014-02-13Version 2
We study the semilinear elliptic equation $\Delta u + g(x,u,Du) = 0$ in $\R^n$. The nonlinearities $g$ can have arbitrary growth in $u$ and $Du$, including in particular the exponential behavior. No restriction is imposed on the behavior of $g(x,z,p)$ at infinity except in the variable $x$. We obtain a solution $u$ that is locally unique and inherits many of the symmetry properties of $g$. Positivity and asymptotic behavior of the solution are also addressed. Our results can be extended to other domains like half-space and exterior domains. We give some examples.
Asymptotic behavior of global solutions of the $u_t=Δu + u^{p}$
Asymptotic behavior of the solution of quasilinear parametric variational inequalities in a beam with a thin neck
Asymptotic behavior of a structure made by a plate and a straight rod
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