AbstractIn this paper, several best approximation theorems and coincidence theorems involving two mappings with point-values and set-values and two different topological vector spaces are proved. The results improve, unify, and generalize most of the recent known results in the literature
Properties of the coincidence set of two mappings are studied. Both single-valued and set-valued map...
In this paper we prove a fixed point theorem for nonexpansive mapping using a well known result of K...
In hyperconvex metric spaces, we first present a coincidence point theorem for condensing set-valued...
In this paper, several best approximation theorems and coincidence theorems involving two mappings w...
AbstractIn this paper, several best approximation theorems and coincidence theorems involving two ma...
We establish some deterministic and random approximation results with the help of two continuous map...
In this paper we present further extension of the best approximations theorems obtained by Ky Fan, J...
Abstract- The aim of this paper is to prove a fixed point theorem using semicontractive mapping a we...
Abstract. The main goal of this paper is to put some light in several arguments that have been used ...
Abstract. For a subset K of a metric space (X, d) and x ∈ X, the set PK(x) = {y ∈ K: d(x, y) = d(x...
Let X be a Hausdorff compact space, E a topological vector space on which E* separates points, F:X→2...
ABSTRACT. Let X be a Hausdorff compact space, E a topological vector space on which E" separate...
Abstract. In this paper we generalize and extend Brosowski-Meinardus type results on invariant point...
Abstract In hyperconvex metric spaces, we first present a coincidence point theorem for condensing s...
Assume f be a real valued function on a topological vector space X. We extend known notions of f-bes...
Properties of the coincidence set of two mappings are studied. Both single-valued and set-valued map...
In this paper we prove a fixed point theorem for nonexpansive mapping using a well known result of K...
In hyperconvex metric spaces, we first present a coincidence point theorem for condensing set-valued...
In this paper, several best approximation theorems and coincidence theorems involving two mappings w...
AbstractIn this paper, several best approximation theorems and coincidence theorems involving two ma...
We establish some deterministic and random approximation results with the help of two continuous map...
In this paper we present further extension of the best approximations theorems obtained by Ky Fan, J...
Abstract- The aim of this paper is to prove a fixed point theorem using semicontractive mapping a we...
Abstract. The main goal of this paper is to put some light in several arguments that have been used ...
Abstract. For a subset K of a metric space (X, d) and x ∈ X, the set PK(x) = {y ∈ K: d(x, y) = d(x...
Let X be a Hausdorff compact space, E a topological vector space on which E* separates points, F:X→2...
ABSTRACT. Let X be a Hausdorff compact space, E a topological vector space on which E" separate...
Abstract. In this paper we generalize and extend Brosowski-Meinardus type results on invariant point...
Abstract In hyperconvex metric spaces, we first present a coincidence point theorem for condensing s...
Assume f be a real valued function on a topological vector space X. We extend known notions of f-bes...
Properties of the coincidence set of two mappings are studied. Both single-valued and set-valued map...
In this paper we prove a fixed point theorem for nonexpansive mapping using a well known result of K...
In hyperconvex metric spaces, we first present a coincidence point theorem for condensing set-valued...
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