Biharmonic nonlinear scalar field equations
Abstract
We prove a Brezis-Kato-type regularity result for weak solutions to the biharmonic nonlinear equation 2 u = g(x,u) RN with a Carath\'eodory function g:RN× R R, N≥ 5. The regularity results give rise to the existence of ground state solutions provided that g has a general subcritical growth at infinity. We also conceive a new biharmonic logarithmic Sobolev inequality ∫RN|u|2 |u|\,dx≤N8 (C∫RN| u|2\,dx ), u ∈ H2(RN), \; ∫RNu2\,dx = 1, for a constant 0<C< (2π e N)2 and we characterize its minimizers.
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