Abstract
In this paper we present a very simple proof of the existence of at least one nontrivial solution for a Kirchhoff-type equation on ${{\mathbb{R}^N}}$, for $N\ge 3$. In particular, in the first part of the paper we are interested in studying the existence of a positive solution to the elliptic Kirchhoff equation under the effect of a nonlinearity satisfying the general Berestycki-Lions assumptions. In the second part we look for ground states using minimizing arguments on a suitable natural constraint.
Citation
Antonio Azzollini. "The elliptic Kirchhoff equation in $\mathbb R^N$ perturbed by a local nonlinearity." Differential Integral Equations 25 (5/6) 543 - 554, May/June 2012. https://doi.org/10.57262/die/1356012678
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