We consider radial solution $u(|x|)$, $x in RR^n$, of a $p$-Laplace equation with non-linear potential depending also on the space variable $x$. We assume that the potential is polynomial and it is negative for $u$ small and positive and subcritical for $u$ large. We prove the existence of radial Ground States under suitable Hypotheses on the potential $f(u,|x|)$. Furthermore we prove the existence of uncountably many radial Singular Ground States; this last result seems to be new even for the spatial independent case and even for $p=2$. The proofs combine an energy analysis and a new dynamical systems method.
Ground states and singular ground states for quasilinear elliptic equations in the subcritical case / FRANCA, Matteo. - In: FUNKCIALAJ EKVACIOJ. - ISSN 0532-8721. - STAMPA. - 48:3(2005), pp. 331-349. [10.1619/fesi.48.331]
Ground states and singular ground states for quasilinear elliptic equations in the subcritical case
FRANCA, Matteo
Membro del Collaboration Group
2005
Abstract
We consider radial solution $u(|x|)$, $x in RR^n$, of a $p$-Laplace equation with non-linear potential depending also on the space variable $x$. We assume that the potential is polynomial and it is negative for $u$ small and positive and subcritical for $u$ large. We prove the existence of radial Ground States under suitable Hypotheses on the potential $f(u,|x|)$. Furthermore we prove the existence of uncountably many radial Singular Ground States; this last result seems to be new even for the spatial independent case and even for $p=2$. The proofs combine an energy analysis and a new dynamical systems method.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
