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Generic existence result for an eigenvalue problemwith rapidly growing principal operator

Published online by Cambridge University Press:  15 October 2004

Vy Khoi Le*
Affiliation:
Department of Mathematics and Statistics, University of Missouri–Rolla, MO 65401, USA; vy@umr.edu.
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Abstract

We consider the eigenvalue problem $$ \begin{array}{l}\displaystyle-{\rm div} (a(|\nabla u |)\nabla u) = \lambda g(x, u) \;\mbox{in } \Omega u = 0\;\mbox{on } \partial\Omega ,\end{array}$$ in the case where the principal operator has rapid growth. By using a variational approach, we show that under certain conditions, almost all λ > 0 are eigenvalues.

Type
Research Article
Copyright
© EDP Sciences, SMAI, 2004

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References

R. Adams, Sobolev spaces. Academic Press, New York (1975).
Ambrosetti, A. and Rabinowitz, P., Dual variational methods in critical point theory and applications. J. Funct. Anal. 14 (1973) 349-381. CrossRef
Chang, K.C., Variational methods for nondifferentiable functionals and their applications to partial differential equations. J. Math. Anal. Appl. 80 (1981) 102-129. CrossRef
F.H. Clarke, Optimization and nonsmooth analysis. SIAM, Philadelphia (1990).
Clément, P., García-Huidobro, M., Manásevich, R. and Schmitt, K., Mountain pass type solutions for quasilinear elliptic equations. Calc. Var. 11 (2000) 33-62. CrossRef
Donaldson, T., Nonlinear elliptic boundary value problems in Orlicz-Sobolev spaces. J. Diff. Equations 10 (1971) 507-528. CrossRef
Donaldson, T. and Trudinger, N., Orlicz-Sobolev spaces and imbedding theorems. J. Funct. Anal. 8 (1971) 52-75. CrossRef
García-Huidobro, M., Le, V.K., Manásevich, R. and Schmitt, K., On principal eigenvalues for quasilinear elliptic differential operators: An Orlicz-Sobolev space setting. Nonlinear Diff. Eq. Appl. 6 (1999) 207-225. CrossRef
Gossez, J.P., Nonlinear elliptic boundary value problems for equations with rapidly or slowly increasing coefficients. Trans. Amer. Math. Soc. 190 (1974) 163-205. CrossRef
Gossez, J.P. and Manásevich, R., On a nonlinear eigenvalue problem in Orlicz-Sobolev spaces. Proc. Roy. Soc. Edinb. A 132 (2002) 891-909. CrossRef
Gossez, J.P. and Mustonen, V., Variational inequalities in Orlicz-Sobolev spaces. Nonlinear Anal. 11 (1987) 379-392. CrossRef
Jeanjean, L., On the existence of bounded Palais-Smale sequences and application to a Landesman-Lazer-type problem set on ${{\bf {R}}^N}$ . Proc. Roy. Soc. Edinb. A 129 (1999) 787-809. CrossRef
Jeanjean, L. and Toland, J.F., Bounded Palais-Smale mountain-pass sequences. C.R. Acad. Sci. Paris Ser. I Math. 327 (1998) 23-28. CrossRef
Kourogenis, N.C. and Papageorgiou, N.S., Nonsmooth critical point theory and nonlinear elliptic equations at resonance. J. Austral. Math. Soc. (Ser. A) 69 (2000) 245-271. CrossRef
M.A. Krasnosels'kii and J. Rutic'kii, Convex functions and Orlicz spaces. Noorhoff, Groningen (1961).
A. Kufner, O. John and S. Fučic, Function spaces. Noordhoff, Leyden (1977).
Le, V.K., A global bifurcation result for quasilinear eliptic equations in Orlicz-Sobolev space. Topol. Methods Nonlinear Anal. 15 (2000) 301-327. CrossRef
Le, Nontrivial, V.K. solutions of mountain pass type of quasilinear equations with slowly growing principal parts. J. Diff. Int. Eq. 15 (2002) 839-862.
Le, V.K. and Schmitt, K., Quasilinear elliptic equations and inequalities with rapidly growing coefficients. J. London Math. Soc. 62 (2000) 852-872. CrossRef
Mustonen, V. and Tienari, M., An eigenvalue problem for generalized Laplacian in Orlicz-Sobolev spaces. Proc. Roy. Soc. Edinb. A 129 (1999) 153-163. CrossRef
Mustonen, V., Remarks on inhomogeneous elliptic eigenvalue problems. Part. Differ. Equ. Lect. Notes Pure Appl. Math. 229 (2002) 259-265.
Z. Naniewicz and P.D. Panagiotopoulos, Mathematical theory of hemivariational inequalities and applications. Marcel Dekker, New York (1995).
Rabinowitz, P., Some aspects of nonlinear eigenvalue problems. Rocky Mountain J. Math. 3 (1973) 162-202. CrossRef
Struwe, M., Existence of periodic solutions of Hamiltonian systems on almost every energy surface. Bol. Soc. Brasil Mat. 20 (1990) 49-58. CrossRef
M. Struwe, Variational methods. 2nd ed., Springer, Berlin (1991).
Tienari, M., Ljusternik-Schnirelmann theorem for the generalized Laplacian. J. Differ. Equations 161 (2000) 174-190. CrossRef