A topological degree theory for perturbed AG(S+)-operators and applications to nonlinear problems

Abstract Let X be a real reflexive Banach space with X ⁎ its dual space and G be a nonempty and open subset of X. Let A : X ⊇ D ( A ) → 2 X ⁎ be a strongly quasibounded maximal monotone operator and T : X ⊇ D ( T ) → 2 X ⁎ be an operator of class A G ( S + ) introduced by Kittila. We develop a topological degree theory for the operator A + T . The theory generalizes the Browder degree theory for operators of type ( S + ) and extends the Kittila degree theory for operators of class A G ( S + ) . New existence results are established. The existence results give generalizations of similar known results for operators of type ( S + ) . Applications to strongly nonlinear problems are included.

[1]  E. Zeidler Nonlinear functional analysis and its applications , 1988 .

[2]  Haim Brezis,et al.  Perturbations of nonlinear maximal monotone sets in banach space , 1970 .

[3]  Nobuyuki Kenmochi,et al.  Nonlinear operators of monotone type in reflexive Banach spaces and nonlinear perturbations , 1974 .

[4]  A variational inequality theory for constrained problems in reflexive Banach spaces , 2019, Advances in Operator Theory.

[5]  F E Browder Degree of mapping for nonlinear mappings of monotone type: Densely defined mapping. , 1983, Proceedings of the National Academy of Sciences of the United States of America.

[6]  Peter Hess,et al.  Nonlinear mappings of monotone type in Banach spaces , 1972 .

[7]  F E Browder Degree of mapping for nonlinear mappings of monotone type. , 1983, Proceedings of the National Academy of Sciences of the United States of America.

[8]  D. Pascali,et al.  Nonlinear mappings of monotone type , 1979 .

[9]  S. L. Troyanski,et al.  On locally uniformly convex and differentiable norms in certain non-separable Banach spaces , 1971 .

[10]  Teffera M. Asfaw,et al.  Variational inequalities for perturbations of maximal monotone operators in reflexive Banach spaces , 2014 .

[11]  M. Otani,et al.  Topological degree for (S)+-mappings with maximal monotone perturbations and its applications to variational inequalities , 2004 .

[12]  Dhruba R. Adhikari,et al.  Topological degree theories and nonlinear operator equations in Banach spaces , 2008 .

[13]  Existence Theorems on Solvability of Constrained Inclusion Problems and Applications , 2018, Abstract and Applied Analysis.

[14]  Topological degree for quasibounded multivalued (S̃)+-perturbations of maximal monotone operators , 2019, Applicable Analysis.

[15]  On the degree theory for general mappings of monotone type , 2008 .

[16]  Viorel Barbu,et al.  Nonlinear Differential Equations of Monotone Types in Banach Spaces , 2010 .