Regularity of Extremal Solutions in Fourth Order Nonlinear Eigenvalue Problems on General Domains
Abstract
We examine the regularity of the extremal solution of the nonlinear eigenvalue problem 2 u = λ f(u) on a general bounded domain in N, with the Navier boundary condition u= u =0 on . Here λ is a positive parameter and f is a non-decreasing nonlinearity with f(0)=1. We give general pointwise bounds and energy estimates which show that for any convex and superlinear nonlinearity f, the extremal solution u* is smooth provided N≤ 5.
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