Applicazioni della teoria del minimax a problemi ... - Portale Posta DMI
Applicazioni della teoria del minimax a problemi ... - Portale Posta DMI
Applicazioni della teoria del minimax a problemi ... - Portale Posta DMI
You also want an ePaper? Increase the reach of your titles
YUMPU automatically turns print PDFs into web optimized ePapers that Google loves.
Bibliografia 105<br />
[65] A. Kristály, Existence of two non–trivial solutions for a class of quasilinear elliptic<br />
variational systems on strip–like domain, Proc. Edinb. Math. Soc. (2) 48 (2005)<br />
465–477.<br />
[66] A. Kristály, Infinitely many solutions for a differential inclusion problem in R N , J.<br />
Differential Equations 220 (2006) 511–530.<br />
[67] A. Kristály, Multiple solutions for a sublinear Schrodinger equation, in corso di stampa<br />
su NoDEA Nonlinear Differential Equations Appl.<br />
[68] A. Kristály, H. Lisei, Cs. Varga, Multiple solutions for p–Laplacian type equations, in<br />
corso di stampa su Nonlinear Anal.<br />
[69] A. Kristály, V. Rădulescu, Sublinear eigenvalue problems on compact Riemannian<br />
manifolds with appliations in Emden–Fowler equations, preprint.<br />
[70] A. Kristály, Cs. Varga, Multiple solutions for elliptic problems with singular and<br />
sublinear potentials, Proc. Amer. Math. Soc. 135 (2007) 2121–2126.<br />
[71] A. Kristály, Cs. Varga, V. Varga, A nonsmooth principle of symmetric criticality and<br />
variational–hemivariational inequalities, J. Math. Anal. Appl. 325 (2007) 975–986.<br />
[72] S.Th. Kyritsi, N.S. Papageorgiou, Nonsmooth critical point theory on closed convex<br />
sets and nonlinear hemivariational inequalities, Nonlinear Anal. 61 (2005) 373–403.<br />
[73] S.Th. Kyritsi, N.S. Papageorgiou, Multiple solutions for strongly resonant nonlinear<br />
elliptic problems with discontinuities, Proc. Amer. Math. Soc. 133 (2005) 2369–2376.<br />
[74] S.Th. Kyritsi, N.S. Papageorgiou, Pairs of positive solutions for p-Laplacian equations<br />
with combined nonlinearities, preprint.<br />
[75] S.Th. Kyritsi, N.S. Papageorgiou, An obstacle problem for nonlinear hemivariational<br />
inequalities at resonance, J. Math. Anal. Appl. 276 (2002) 292-313.<br />
[76] P.–L. Lions, Symétrie et compacité dans les espaces de Sobolev, J. Funct. Anal. 49<br />
(1982) 315–334.<br />
[77] R. Livrea, Existence of three solutions for a quasilinear two point boundary value<br />
problem, Arch. Mat. (Basel) 79 (2002) 288–298.<br />
[78] R. Livrea, S.A. Marano, Existence and classification of critical points for<br />
nondifferentiable functions, Adv. Differential Equations 9 (2004) 961–978.<br />
[79] S.A. Marano, D. Motreanu, On a three critical points theorem for non-differentiable<br />
functions and applications to nonlinear boundary value problems, Nonlinear Anal. 48<br />
(2002) 37–52.<br />
[80] J. Mawhin, M. Willem, Critical point theory and Hamiltonian systems, Springer-<br />
Verlag (1989).