Inverse function theorems for smooth nonlinear maps defined on convex cones in Banach spaces in a neighborhood of an irregular point are considered. The corresponding covering theorem is proved. The proofs are based on a Banach open mapping theorem for convex cones in Banach spaces, which is also proved in the paper. Sufficient conditions for tangency to the zero set of a nonlinear map without a priori regularity assumptions are obtained. © 2005 Springer Science+Business Media, Inc
We prove a uniform boundedness principle for the Lipschitz seminorm of continuous, monotone, positiv...
AbstractIt is shown that in a Banach space X with weak uniform normal structure, every demicontinuou...
Suppose T is a continuous linear operator between two Hilbert spaces X and Y and let K be a closed c...
Inverse function theorems for smooth nonlinear maps defined on convex cones in Banach spaces in a ne...
Nonlinear mappings in Banach spaces are considered. The covering property, metric regularity, and th...
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Summary: "An operator equation described by a smooth nonlinear mapping acting in Banach spaces is co...
We study the solubility of systems of non-linear equations in a neighbourhood of an abnormal point a...
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Suppose T is a continuous linear operator between two Hilbert spaces X and Y and let K be a closed ...
Nonlinear functional analysis and applications is an area of study that has provided fascination for...
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Let be a closed convex subset of a real Banach space , is continuous pseudocontractive mapping, a...
ABSTRACT. We use a coefficient to give fixed point theorems in the setting of Banach spaces with the...
We prove a uniform boundedness principle for the Lipschitz seminorm of continuous, monotone, positiv...
AbstractIt is shown that in a Banach space X with weak uniform normal structure, every demicontinuou...
Suppose T is a continuous linear operator between two Hilbert spaces X and Y and let K be a closed c...
Inverse function theorems for smooth nonlinear maps defined on convex cones in Banach spaces in a ne...
Nonlinear mappings in Banach spaces are considered. The covering property, metric regularity, and th...
Let X,Y be Banach spaces. Let F(x) be an operator mapping X into Y. We assume that F(x) is twice con...
Summary: "An operator equation described by a smooth nonlinear mapping acting in Banach spaces is co...
We study the solubility of systems of non-linear equations in a neighbourhood of an abnormal point a...
AbstractWe extend the classical inverse and implicit function theorems, the implicit function theore...
AbstractWe prove a generalization of Gravesʼ Open Mapping Theorem for a class of mappings which can ...
Suppose T is a continuous linear operator between two Hilbert spaces X and Y and let K be a closed ...
Nonlinear functional analysis and applications is an area of study that has provided fascination for...
AbstractThis paper presents conditions for openness with linear rate (or, equivalently, for metric r...
Let be a closed convex subset of a real Banach space , is continuous pseudocontractive mapping, a...
ABSTRACT. We use a coefficient to give fixed point theorems in the setting of Banach spaces with the...
We prove a uniform boundedness principle for the Lipschitz seminorm of continuous, monotone, positiv...
AbstractIt is shown that in a Banach space X with weak uniform normal structure, every demicontinuou...
Suppose T is a continuous linear operator between two Hilbert spaces X and Y and let K be a closed c...