Increasing radial solutions for Neumann problems without growth
  restrictions

Amann; Ambrosetti; Ambrosetti; Barutello; Benedetta Noris; Benjamin; Bonheure; del Pino; Denis Bonheure; Grossi; Krasnoselʼskiĭ; Krasnoselʼskiĭ; Kwong; Li; Nussbaum; Pohozaev; Serra; Tobias Weth

research

Increasing radial solutions for Neumann problems without growth restrictions

Authors: Amann
Ambrosetti
Ambrosetti
Barutello
Benedetta Noris
Benjamin
Bonheure
del Pino
Denis Bonheure
Grossi
Krasnoselʼskiĭ
Krasnoselʼskiĭ
Kwong
Li
Nussbaum
Pohozaev
Serra
Tobias Weth
Publication date: 19 September 2011
Publisher: 'Elsevier BV'
Doi

Abstract

We study the existence of positive increasing radial solutions for superlinear Neumann problems in the ball. We do not impose any growth condition on the nonlinearity at infinity and our assumptions allow for interactions with the spectrum. In our approach we use both topological and variational arguments, and we overcome the lack of compactness by considering the cone of nonnegative, nondecreasing radial functions of H^1.Comment: 16 page