Some continuation properties via minimax arguments.
A positive solution for an asymptotically linear elliptic problem on autonomous at infinity
In this paper we establish the existence of a positive solution for an asymptotically linear elliptic problem on . The main difficulties to overcome are the lack of a priori bounds for Palais–Smale sequences and a lack of compactness as the domain is unbounded. For the first one we make use of techniques introduced by Lions in his work on concentration compactness. For the second we show how the fact that the “Problem at infinity” is autonomous, in contrast to just periodic, can be used in order...
Minimax characterization of solutions for a semi-linear elliptic equation with lack of compactness
Existence and symmetry of least energy solutions for a class of quasi-linear elliptic equations
A variational approach to bifurcation into spectral gaps
A positive solution for an asymptotically linear elliptic problem on autonomous at infinity
In this paper we establish the existence of a positive solution for an asymptotically linear elliptic problem on . The main difficulties to overcome are the lack of bounds for Palais–Smale sequences and a lack of compactness as the domain is unbounded. For the first one we make use of techniques introduced by Lions in his work on concentration compactness. For the second we show how the fact that the “Problem at infinity” is autonomous, in contrast to just periodic, can be used in order to regain...
Homoclinic orbits on non-compact riemannian manifolds for second order hamiltonian systems
Multi-peak solutions for magnetic NLS equations without non-degeneracy conditions
In this work we consider the magnetic NLS equation where , is a magnetic potential, possibly unbounded, is a multi-well electric potential, which can vanish somewhere, is a subcritical nonlinear term. We prove the existence of a semiclassical multi-peak solution to (0.1), under conditions on the nonlinearity which are nearly optimal.
Multi-peak solutions for magnetic NLS equations without non-degeneracy conditions
In this work we consider the magnetic NLS equation where , is a magnetic potential, possibly unbounded, is a multi-well electric potential, which can vanish somewhere, is a subcritical nonlinear term. We prove the existence of a semiclassical multi-peak solution to (0.1), under conditions on the nonlinearity which are nearly optimal.
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