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Flat Solutions of Some Non-Lipschitz Autonomous Semilinear Equations May be Stable for {N}geq 3 |
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| Authors: | Jes''us Ildefonso D''IAZ Jes''us HERN''ANDEZ Yavdat IL''YASOV |
| Affiliation: | 1. Instituto de Matemática Interdisciplinar, Universidad Complutense de Madrid 28040 Madrid, Spain;2. Departamento de Matemáticas, Universidad Autónoma de Madrid 28049 Cantoblanco, Madrid, Spain;3. Institute of Mathematics, Ufa Science Center of RAS 112, Chernyshevsky Str., Ufa 450077, Russia |
| Abstract: | The authors prove that flat ground state solutions (i.e. minimizing the energy and with gradient vanishing on the boundary of the domain) of the Dirichlet problem associated to some semilinear autonomous elliptic equations with a strong absorption term given by a non-Lipschitz function are unstable for dimensions N = 1,2 and they can be stable for N ≥ 3 for suitable values of the involved exponents. |
| Keywords: | Semilinear elliptic and parabolic equation Strong absorption Spectral problem,Nehari manifolds Pohozaev identity Flat solution Linearized stability Lyapunov function Global instability |
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