DOIAbstract
AbstractIt is shown, within Bishop's constructive mathematics, that if a point is sufficiently close to a differentiable Jordan curve with suitably restricted curvature, then that point has a unique closest point on the curve
AbstractIt is shown, within Bishop's constructive mathematics, that if a point is sufficiently close to a differentiable Jordan curve with suitably restricted curvature, then that point has a unique closest point on the curve
In this paper, we ensure the existence and uniqueness of a best proximity point in rectangular metri...
This is the preliminary version of a chapter that will appear in the {\em Handbook on Computational ...
Summary. The proof of the Jordan Curve Theorem according to [11] is continued. The notions of the fi...
AbstractIt is shown, within Bishop's constructive mathematics, that if a point is sufficiently close...
This paper presents an accurate and efficient method for computation of the closest point on paramet...
AbstractThe existence and uniqueness of a shortest polygonal path in a compact planar set bounded by...
We establish an existence and uniqueness theorem on best proximity point for contractive mappings on...
The formal mathematical definition of a Jordan curve (a non-self-intersecting continuous loop in the...
Many problems arising in different areas of mathematics, such as optimization, variational analysis,...
In this paper we introduce geometric contraction map and give a new condition for the existence and...
Title: The Jordan Curve Theorem Author: Jan Dudák Department: Department of Mathematical Analysis Su...
It is shown that a subset S of a digital picture is a simple closed curve if and only if its complem...
The closest point method for solving partial differential equations (PDEs) posed on surfaces was rec...
The Closest Point Method for solving partial differential equations (PDEs) posed on surfaces was rec...
AbstractWe consider all planar oriented curves that have the following property depending on a fixed...
In this paper, we ensure the existence and uniqueness of a best proximity point in rectangular metri...
This is the preliminary version of a chapter that will appear in the {\em Handbook on Computational ...
Summary. The proof of the Jordan Curve Theorem according to [11] is continued. The notions of the fi...
AbstractIt is shown, within Bishop's constructive mathematics, that if a point is sufficiently close...
This paper presents an accurate and efficient method for computation of the closest point on paramet...
AbstractThe existence and uniqueness of a shortest polygonal path in a compact planar set bounded by...
We establish an existence and uniqueness theorem on best proximity point for contractive mappings on...
The formal mathematical definition of a Jordan curve (a non-self-intersecting continuous loop in the...
Many problems arising in different areas of mathematics, such as optimization, variational analysis,...
In this paper we introduce geometric contraction map and give a new condition for the existence and...
Title: The Jordan Curve Theorem Author: Jan Dudák Department: Department of Mathematical Analysis Su...
It is shown that a subset S of a digital picture is a simple closed curve if and only if its complem...
The closest point method for solving partial differential equations (PDEs) posed on surfaces was rec...
The Closest Point Method for solving partial differential equations (PDEs) posed on surfaces was rec...
AbstractWe consider all planar oriented curves that have the following property depending on a fixed...
In this paper, we ensure the existence and uniqueness of a best proximity point in rectangular metri...
This is the preliminary version of a chapter that will appear in the {\em Handbook on Computational ...
Summary. The proof of the Jordan Curve Theorem according to [11] is continued. The notions of the fi...
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