Abstract
Abstract We prove nonexistence and uniqueness results of solutions for biharmonic equations under the Dirichlet boundary conditions on a smooth bounded domain. We carry on the work in [10] where the Navier boundary conditions were considered, we define the h-starlikeness of Ω with respect to the Dirichlet boundary conditions and a classifying number M * ( Ω ) ${M^{*}(\Omega)}$ . This allows us to give a generalized critical exponent for these domains which play the role of the classical critical exponent N + 4 N - 4 ${\frac{N+4}{N-4}}$ . Our approach is based on the Rellich–Pohozaev type identity [20, 23]. We study some examples of Dirichlet h-starlike domains with either rich topology or rich geometry where our results can apply.
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