We define classes of mappings of monotone type with respect to a given direct sum decomposition of the underlying Hilbert space H. The new classes are extensions of classes of mappings of monotone type familiar in the study of partial differential equations, for example, the class (S+) and the class of pseudomonotone mappings. We then construct an extension of the Leray-Schauder degree for mappings involving the above classes. As shown by (semi-abstract) examples, this extension of the degree should be useful in the study of semilinear equations, when the linear part has an infinite-dimensional kernel
AbstractLet E be a real separable Banach space, E∗ the dual space of E, and Ω⊂E an open bounded subs...
In this article, for the purpose of expanding to the mappings between Banach manifolds, a degree is ...
AbstractWe introduce a new extension of the classical Leray–Schauder topological degree in a real se...
AbstractDegree theory has been developed as a tool for checking the solution existence of nonlinear ...
AbstractF. E. Browder has recently extended the concept of the classical topological degree for mapp...
We introduce a new construction of topological degree for densely defined mappings of monotone type....
We introduce a new construction of topological degree for densely defined mappings of monotone type....
Since the 1960s, many researchers have extended topological degree theory to various non-compact typ...
In this work, we demonstrate that the Leray-Schauder topological degree theory can be used for the d...
In this work, we demonstrate that the Leray-Schauder topological degree theory can be used for the d...
AbstractDegree theory has been developed as a tool for checking the solution existence of nonlinear ...
AbstractWe introduce a new extension of the classical Leray–Schauder topological degree in a real se...
The Leray-Schauder degree is defined for mappings of the form $I-C$, where $C$ is a compact mapping ...
Abstract: We consider semilinear equations, where the linear part L is non-symmetric and has a possi...
summary:The Leray-Schauder degree is extended to certain multi-valued mappings on separable Hilbert ...
AbstractLet E be a real separable Banach space, E∗ the dual space of E, and Ω⊂E an open bounded subs...
In this article, for the purpose of expanding to the mappings between Banach manifolds, a degree is ...
AbstractWe introduce a new extension of the classical Leray–Schauder topological degree in a real se...
AbstractDegree theory has been developed as a tool for checking the solution existence of nonlinear ...
AbstractF. E. Browder has recently extended the concept of the classical topological degree for mapp...
We introduce a new construction of topological degree for densely defined mappings of monotone type....
We introduce a new construction of topological degree for densely defined mappings of monotone type....
Since the 1960s, many researchers have extended topological degree theory to various non-compact typ...
In this work, we demonstrate that the Leray-Schauder topological degree theory can be used for the d...
In this work, we demonstrate that the Leray-Schauder topological degree theory can be used for the d...
AbstractDegree theory has been developed as a tool for checking the solution existence of nonlinear ...
AbstractWe introduce a new extension of the classical Leray–Schauder topological degree in a real se...
The Leray-Schauder degree is defined for mappings of the form $I-C$, where $C$ is a compact mapping ...
Abstract: We consider semilinear equations, where the linear part L is non-symmetric and has a possi...
summary:The Leray-Schauder degree is extended to certain multi-valued mappings on separable Hilbert ...
AbstractLet E be a real separable Banach space, E∗ the dual space of E, and Ω⊂E an open bounded subs...
In this article, for the purpose of expanding to the mappings between Banach manifolds, a degree is ...
AbstractWe introduce a new extension of the classical Leray–Schauder topological degree in a real se...
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