Energy estimates for seminodal solutions to an elliptic system with mixed couplings
Abstract
We study the system of semilinear elliptic equations - ui+ ui = Σj=1 βij|uj|p|ui|p-2ui, ui∈ H1(RN), i=1,…,, where N≥ 4, 1<p<NN-2, and the matrix (βij) is symmetric and admits a block decomposition such that the entries within each block are positive or zero and all other entries are negative. We provide simple conditions on (βij), which guarantee the existence of fully nontrivial solutions, i.e., solutions all of whose components are nontrivial. We establish existence of fully nontrivial solutions to the system having a prescribed combination of positive and nonradial sign-changing components, and we give an upper bound for their energy when the system has at most two blocks. We derive the existence of solutions with positive and nonradial sign-changing components to the system of singularly perturbed elliptic equations -2 ui+ ui = Σj=1 βij|uj|p|ui|p-2ui, ui∈ H10(B1(0)), i=1,…,, in the unit ball, exhibiting two different kinds of asymptotic behavior: solutions whose components decouple as 0, and solutions whose components remain coupled all the way up to their limit.
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