CAVALCANTE, M. P. A.; http://lattes.cnpq.br/9419403034644726; CAVALCANTE, Marcius Petrúcio de Almeida.
Abstract:
In this thesis we study the existence of solutions for a class of semilinear Schr¨odinger equations
of the form
− u + V (x)u = ¯ f(x, u), x ∈ RN,
where N ≥ 2, the potential V is a 1-periodic continuous function. In dimension N ≥ 3, we
assume that 0 lies in a spectral gap of the Schr¨odinger operator S = − +V and the nonlinearity
is from concave and convex type. In dimension N = 2, we assume that 0 lies in a spectral gap
or on the boundary of a spectral gap of S and we deal with nonlinearities having exponential
growth in the Trudinger-Moser sense. We treat the case where ¯ f(x, t) is periodic as well as the
nonperiodic one. The proofs relies on variational setting, by using linking-type theorems, some
Trudinger-Moser inequalities and concentration-compactness principles.