arXiv:math/0701757 Abstract

arXiv:math/0701757 [math.AP]Abstract References Reviews Resources

A multiplicity result for the problem $δd ξ= f'(<ξ,ξ>)ξ$

Published 2007-01-25Version 1

In this paper we consider the nonlinear equation involving differential forms on a compact Riemannian manifold $\delta d \xi = f'(<\xi,\xi>)\xi$. This equation is a generalization of the semilinear Maxwell equations recently introduced in a paper by Benci and Fortunato. We obtain a multiplicity result both in the positive mass case (i.e. $f'(t)\geq\epsilon>0$ uniformly) and in the zero mass case ($f'(t)\geq 0$ and $f'(0)=0$) where a strong convexity hypothesis on the nonlinearity is assumed.

Comments: 24 pages

Categories: math.AP

Subjects: 35Q55

Keywords: multiplicity result, zero mass case, semilinear maxwell equations, strong convexity hypothesis, compact riemannian manifold

Related articles: Most relevant | Search more

arXiv:1901.01601 [math.AP] (Published 2019-01-06)

Multiple solutions of an elliptic Hardy-Sobolev equation with critical exponents on compact Riemannian manifolds

Youssef Maliki, Fatima Zohra Terki

arXiv:1611.00462 [math.AP] (Published 2016-11-02)

Endpoint resolvent estimates for compact Riemannian manifolds

Rupert L. Frank, Lukas Schimmer

arXiv:2209.00069 [math.AP] (Published 2022-08-31)

Frational p-Laplacian on Compact Riemannian Manifold

A. Ouaziz, A. Aberqi

arXiv Analytics

arXiv:math/0701757 [math.AP]Abstract References Reviews Resources

A multiplicity result for the problem $δd ξ= f'(<ξ,ξ>)ξ$

Links

Toolbox

arXiv:math/0701757 [math.AP]AbstractReferencesReviewsResources

A multiplicity result for the problem $δd ξ= f'(<ξ,ξ>)ξ$

Links

Toolbox

arXiv:math/0701757 [math.AP]Abstract References Reviews Resources