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106 Bibliografia [81] D. Motreanu, P.D. Panagiotopoulos, Minimax theorems and qualitative properties of the solutions of hemivariational inequalities, Kluwer Academic Publishers (1999). [82] D. Motreanu, V. Rădulescu, Variational and non–variational methods in nonlinear analysis and boundary value problems, Kluwer Academic Publishers (2003). [83] D. Motreanu, Cs. Varga, A nonsmooth equivariant minimax principle, Commun. Appl. Anal. 3 (1999) 115–130. [84] J. Von Neumann, On the theory of games of strategy, Princeton University Press (1959). [85] R.S. Palais, The principle of symmetric criticality, Comm. Math. Phys. 69 (1979) 19–30. [86] P.D. Panagiotopoulos, Inequality problems in mechanics and applications. Convex and nonconvex energy functions, Birkhäuser (1985). [87] R.A. Plastock, Nonlinear Fredholm maps of index zero and their singularities, Proc. Amer. Math. Soc. 68 (1978) 317–322. [88] P. Pucci, J. Serrin, A mountain pass theorem, J. Differential Equations 60 (1985) 142–149. [89] V.D. Rădulescu, Mountain–pass type theorems for nondifferentiable convex functions, Rev. Roumaine Math. Pures Appl. 39 (1994) 53–62. [90] B. Ricceri, Some topological mini–max theorems via an alternative principle for multifunctions, Arch. Math. (Basel) 60 (1993) 367–377. [91] B. Ricceri, On a topological minimax theorem and its applications, in B. Ricceri, S. Simons, [102], 191–216. [92] B. Ricceri, A new method for the study of nonlinear eigenvalue problems, C. R. Acad. Sci. Paris Sér. I Math. 328 (1999) 251–256. [93] B. Ricceri, Existence of three solutions for a class of elliptic eigenvalue problems, Math. Comput. Modelling 32 (2000) 1485–1494. [94] B. Ricceri, On a three critical points theorem, Arch. Math. (Basel) 75 (2000) 220–226. [95] B. Ricceri, A further improvement of a minimax theorem of Borenshtein and Shul’man, J. Nonlinear Convex Anal. 2 (2001) 279–283. [96] B. Ricceri, Sublevel sets and global minima of coercive functionals and local minima of their perturbations, J. Nonlinear Convex Anal. 5 (2004) 157–168. [97] B. Ricceri, A general multiplicity theorem for certain nonlinear equations in Hilbert spaces, Proc. Amer. Math. Soc. 133 (2005) 3255–3261.
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Coordinatore: Università degli Stu
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Introduzione Nihil certi habemus in
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Introduzione vii sono noti in lette
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Introduzione ix di sella (un tipo d
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Notazioni Introduciamo alcune notaz
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Indice Ringraziamenti iii Introduzi
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Capitolo 1 Teoremi di minimax La te
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Minimax e minimi locali 3 Teorema 1
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Punti di sella 5 Allora, esistono
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Capitolo 2 Alcuni richiami sugli sp
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Insiemi di Chebyshev 9 2.3 Gli insi
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Insiemi di Chebyshev 11 Dimostrazio
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Capitolo 3 Teoria dei punti critici
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Funzionali localmente lipschitziani
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Funzionali di Motreanu-Panagiotopou
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Il Teorema del passo di montagna 19
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Il Teorema del passo di montagna 21
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Il Principio della criticità simme
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Capitolo 4 Problemi variazionali: u
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Disequazioni emivariazionali 27 Lr
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Disequazioni variazionali-emivariaz
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Disequazioni variazionali-emivariaz
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Problemi al contorno 33 Proviamo or
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Problemi al contorno 35 Dimostrazio
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Capitolo 5 Teoremi di molteplicità
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Due minimi locali 39 La struttura d
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Due minimi locali 41 Inoltre, per o
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Soluzioni positive 43 Inoltre, esis
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Soluzioni positive 45 da cui JF (vn
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Soluzioni positive 47 è s.c.s. (co
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Soluzioni positive 49 Siano ora λ
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Nonlinearità discontinue e simmetr
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Nonlinearità discontinue e simmetr
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Page 75 and 76: Disequazione con ostacolo 61 e osse
Page 77 and 78: Disequazione con ostacolo 63 Come p
Page 79 and 80: Disequazione con ostacolo 65 Senza
Page 81 and 82: Disequazione con ostacolo 67 si tro
Page 83 and 84: Capitolo 6 Un teorema di molteplici
Page 85 and 86: Il risultato generale 71 J(u) (6.2.
Page 87 and 88: Un problema di Dirichlet 73 funzion
Page 89 and 90: Un problema di Dirichlet 75 (6.8),
Page 91 and 92: Un’inclusione differenziale 77 Es
Page 93 and 94: Un’inclusione differenziale 79 M
Page 95 and 96: Capitolo 7 Punti di biforcazione pe
Page 97 and 98: Punti singolari 83 sotto opportune
Page 99 and 100: Sistemi non lineari 85 Lemma 7.9. (
Page 101 and 102: Sistemi non lineari 87 (7.10.1) esi
Page 103 and 104: Sistemi non lineari 89 Teorema 7.12
Page 105 and 106: Sistemi lineari 91 La scelta di for
Page 107 and 108: Sistemi lineari 93 Allora esiste ν
Page 109 and 110: Capitolo 8 Buona posizione e insiem
Page 111 and 112: Buona posizione 97 Proviamo ora che
Page 113 and 114: Insiemi di Chebyshev 99 allora, per
Page 115 and 116: Bibliografia [1] R.A. Adams, Sobole
Page 117 and 118: Bibliografia 103 [31] Z. Dályai, C
Page 119: Bibliografia 105 [65] A. Kristály,
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