Estimates for the Sobolev trace constant with critical exponent and applications
Abstract
In this paper we find estimates for the optimal constant in the critical Sobolev trace inequality S\|u\|pLp*(∂) \|u\|pW1,p() that are independent of . This estimates generalized those of [3] for general p. Here p* := p(N-1)/(N-p) is the critical exponent for the immersion and N is the space dimension. Then we apply our results first to prove existence of positive solutions to a nonlinear elliptic problem with a nonlinear boundary condition with critical growth on the boundary, generalizing the results of [16]. Finally, we study an optimal design problem with critical exponent.
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