We prove generic multiplicity of solutions for a scalar field equation on compact surfaces via Morse inequalities. In particular our result improves significantly the multiplicity estimate which can be deduced from the degree-counting formula in Chen and Lin (doi:10.1002/cpa.10107). Related results are derived for the prescribed Q-curvature equatio
AbstractIn this paper, we study the stability and multiple solutions to Einstein-scalar field Lichne...
In this thesis are studied some non-linear problems arising in Riemannian Geometry, namely the Yamab...
AbstractBender–Canfield showed that a plethora of graph counting problems in orientable/non-orientab...
AbstractWe prove generic multiplicity of solutions for a scalar field equation on compact surfaces v...
We consider a scalar field equation on compact surfaces which has variational structure. When the su...
We consider a scalar field equation on compact surfaces which has variational structure. When the su...
The aim of this paper is to study a nonlinear scalar field equation on a surface Σ via a Morse-theor...
We consider a scalar field equation on compact surfaces which have variational structure. When the s...
This paper is devoted to the study of positive radial solutions of the scalar curvature equation, i....
In this Note we present new multiplicity results for the solutions of nonlinear elliptic problems of...
We study existence and multiplicity of radial ground states for the scalar curvature equation Δu+K(|...
We prove the existence of N - 1 distinct pairs of nontrivial solutions of the scalar field equation ...
We prove here the multiplicity results for the solutions of compact $H$-surfaces in Euclidean space....
International audienceWe consider the prescribed scalar curvature equation on an open set of ޒ n ,...
3noWe study existence and multiplicity of positive ground states for the scalar curvature equation ...
AbstractIn this paper, we study the stability and multiple solutions to Einstein-scalar field Lichne...
In this thesis are studied some non-linear problems arising in Riemannian Geometry, namely the Yamab...
AbstractBender–Canfield showed that a plethora of graph counting problems in orientable/non-orientab...
AbstractWe prove generic multiplicity of solutions for a scalar field equation on compact surfaces v...
We consider a scalar field equation on compact surfaces which has variational structure. When the su...
We consider a scalar field equation on compact surfaces which has variational structure. When the su...
The aim of this paper is to study a nonlinear scalar field equation on a surface Σ via a Morse-theor...
We consider a scalar field equation on compact surfaces which have variational structure. When the s...
This paper is devoted to the study of positive radial solutions of the scalar curvature equation, i....
In this Note we present new multiplicity results for the solutions of nonlinear elliptic problems of...
We study existence and multiplicity of radial ground states for the scalar curvature equation Δu+K(|...
We prove the existence of N - 1 distinct pairs of nontrivial solutions of the scalar field equation ...
We prove here the multiplicity results for the solutions of compact $H$-surfaces in Euclidean space....
International audienceWe consider the prescribed scalar curvature equation on an open set of ޒ n ,...
3noWe study existence and multiplicity of positive ground states for the scalar curvature equation ...
AbstractIn this paper, we study the stability and multiple solutions to Einstein-scalar field Lichne...
In this thesis are studied some non-linear problems arising in Riemannian Geometry, namely the Yamab...
AbstractBender–Canfield showed that a plethora of graph counting problems in orientable/non-orientab...
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