Nonlinear Analysis: A Collection of Papers in Honor of Erich H. RothePeriodic solutions of semilinear parabolic equations. Linear maximal monotone operators and singular nonlinear integral equations of hammerstein type. Nonlinear problems across a point of resonance for non-self-adjoint systems. Branching of periodic solutions of nonautonomous systems. Restricted generic bifurcation. On a second-order nonlinear elliptic boundary value problem. Tikhonov regularization and nonlinear problems at resonance - deterministic and random. The eigenvalue problem for variational inequalities and a new version of the ljusternik-schnirelmann theory. Nonlinear boundary value problems for ordinary differential equations: from schauder theorem to stable homotopy. Some minimax theorems and applications to nonlinear partial differential equations. Branching and stability for nonlinear gradient operators. Recent progress in bifurcation theory. On the subgradient of convex functionals. On the stability of bifurcating solutions. |
Contents
Tikhonov Regularization and Nonlinear Problems | 28 |
Linear Maximal Monotone Operators | 31 |
0205 | 69 |
Copyright | |
14 other sections not shown
Other editions - View all
Common terms and phrases
Anal analytic apply assumptions b₁ Banach space bifurcation equations Bifurcation Theory boundary value problem bounded sets c₁ Cesari compact consider constant continuous critical point curve defined denote eigenvalues elliptic finite dimensional fixed point follows Fréchet derivative Functional Analysis H₁ Hence Hilbert space Hölder continuous hypotheses implicit function theorem implies K₁ L₁ least one solution Lemma linear map linear operator Ljusternik-Schnirelmann Math Mawhin maximal monotone method n₁ nonlinear operator nontrivial solution norm null space number of zeros obtain parabolic parameters partial differential equations periodic solutions perturbation positive Proposition Rabinowitz random Rational Mech Remark Sather satisfies Sattinger Section sequence solution branches stability subspace sufficiently small Suppose Theorem 1.2 theory tion topological u₁ variational inequality vector w₁ X₁