On positive entire solutions to the Yamabe-type problem on the Heisenberg and stratified groups.
We consider the following singularly perturbed elliptic problem where satisfies some growth conditions, , and () is a smooth and bounded domain. The cases (Neumann problem) and (Dirichlet problem) have been studied by many authors in recent years. We show that, there exists a generic constant such that, as , the least energy solution has a spike near the boundary if , and has an interior spike near the innermost part of the domain if . Central to our study...
We show that the critical nonlinear elliptic Neumann problem in , in , on , where is a bounded and smooth domain in , has arbitrarily many solutions, provided that is small enough. More precisely, for any positive integer , there exists such that for , the above problem has a nontrivial solution which blows up at interior points in , as . The location of the blow-up points is related to the domain geometry. The solutions are obtained as critical points of some finite-dimensional...
We consider a sequence of multi-bubble solutions of the following fourth order equation where is a positive function, is a bounded and smooth domain in , and is a constant such that . We show that (after extracting a subsequence), for some positive integer , where is the area of the unit sphere in . Furthermore, we obtain the following sharp estimates for : where , and in . This yields a bound of solutions as converges...
We address the problem of the existence of finite energy solitary waves for nonlinear Klein-Gordon or Schrödinger type equations in , , where . Under natural conditions on the nonlinearity , we prove the existence of in any dimension . Our result complements earlier works of Bartsch and Willem and Lorca-Ubilla where solutions invariant under the action of are constructed. In contrast, the solutions we construct are invariant under the action of where denotes the dihedral group...
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