CAJU, R. H. A. L.; http://lattes.cnpq.br/8365361078215926; CAJU, Rayssa Helena Aires de Lima.
Abstract:
In this work we study the asymptotic behavior to positive solutions of the following
coupled elliptic system of nonlinear Schrödinger equations
which are defined in the punctured unit ball B1(0)\{0} for n ≥ 3. Here g is a Riemannian
metric on the unit ball and the potential A is assumed a C1 map such that
Aij(x) is a symmetrical matrix for each x in B1(0). From the viewpoint of conformal
geometry, this systems are pure extensions of Yamabe-type equations.
We will approach the problem assuming first that g is the euclidian metric and
the potential A vanishes. In this case we are able to prove that the solutions of our
problem are asymptotics to what we call Fowler-type solutions. In the general case we
will prove the same result by putting some restrictions on the potential and assuming
that the dimension is less or equal to five.