Positive radial solutions for coupled Schr\"odinger system with critical exponent in N\,(N≥5)
Abstract
We study the following coupled Schr\"odinger system - u+u=u2*-1+ u2*2-1v2*2+1u-1, &x∈ N, - v+v=v2*-1+ u2*2v2*2-1+2vr-1, &x∈ N, u,v > 0, &x∈ N, where N≥ 5, 1,2>0,≠ 0, 2<,r<2*,2* 2NN-2. Note that the nonlinearity and the coupling terms are both critical. Using the Mountain Pass Theorem, Ekeland's variational principle and Nehari mainfold, we show that this critical system has a positive radial solution for positive and some negative respectively.
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