Concentration on the Boundary and Sign-Changing Solutions for a Slightly Subcritical Biharmonic Problem

Abstract

We consider the fourth-order nonlinear elliptic problem: equation* arrayll (a(x) u) = a(x) u p-2-ε u \ in \ , 0.6cm u = 0 \ on \ ∂ , 0.6cm u = 0 \ on \ ∂ , arrayequation* where is a smooth, bounded domain in RN with N ≥ 5. Here, p := 2NN-4 is the Sobolev critical exponent for the embedding H2 H01() Lp(), and a ∈ C2() is a strictly positive function on . We establish sufficient conditions on the function a and the domain for this problem to admit both positive and sign-changing solutions with an explicit asymptotic profile. These solutions concentrate and blow up at a point on the boundary ∂ as ε 0. The proofs of the main results rely on the Lyapunov-Schmidt finite-dimensional reduction method.

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