Bubbles clustered inside for almost critical problems

Abstract

We investigate the existence of blowing-up solutions of the following almost critical problem - u +V(x)u =up-, u>0in , u=0on ∂, where is a bounded regular domain in Rn, n≥ 4, is a small positive parameter, p+1=(2n)/(n-2) is the critical Soblolev exponent and the potential V is a smooth positive function. We find solutions which exhibit bubbles clustered inside as goes to zero. To the best of our knowledge, this is the first existence result for interior non-simple blowing-up positive solutions to Dirichlet problems in general domains. Our results are proven through delicate asymptotic estimates of the gradient of the associated Euler-Lagrange functional.

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