Spike Patterns in the Super-Critical Bahri—Coron Problem
暂无分享,去创建一个
[1] P. Felmer,et al. Two-bubble solutions in the super-critical Bahri-Coron's problem , 2003 .
[2] M. Pino,et al. Multi-Peak Solutions for Super-Critical Elliptic Problems in Domains with Small Holes , 2002 .
[3] O. Rey. The topological impact of critical points at infinity in a variational problem with lack of compactness: the dimension $3$ , 1999, Advances in Differential Equations.
[4] D. Passaseo. Nontrivial solutions of elliptic equations with supercritical exponent in contractible domains , 1998 .
[5] D. Passaseo. New nonexistence results for elliptic equations with supercritical nonlinearity , 1995, Differential and Integral Equations.
[6] Zheng-chao Han. Asymptotic approach to singular solutions for nonlinear elliptic equations involving critical Sobolev exponent , 1991 .
[7] O. Rey. The role of the green's function in a non-linear elliptic equation involving the critical Sobolev exponent , 1990 .
[8] O. Rey. A multiplicity result for a variational problem with lack of compactness , 1989 .
[9] J. Coron,et al. On a nonlinear elliptic equation involving the critical sobolev exponent: The effect of the topology of the domain , 1988 .
[10] P. Fitzpatrick,et al. Global several-parameter bifurcation and continuation theorems: a unified approach via complementing maps , 1983 .
[11] F. W. Warner,et al. Remarks on some quasilinear elliptic equations , 1975 .
[12] Yanyan Li,et al. On a variational problem with lack of compactness: the topological effect of the critical points at infinity , 1995 .
[13] L. Peletier,et al. Asymptotics for Elliptic Equations Involving Critical Growth , 1989 .
[14] G. M.,et al. Partial Differential Equations I , 2023, Applied Mathematical Sciences.