AbstractWe define the infinite-dimensional simplex to be the closure of the convex hull of the standard basis vectors in R∞, and prove that this space has the fixed point property: any continuous function from the space into itself has a fixed point. Our proof is constructive, in the sense that it can be used to find an approximate fixed point; the proof relies on elementary analysis and Sperner's lemma. The fixed point theorem is shown to imply Schauder's fixed point theorem on infinite-dimensional compact convex subsets of normed spaces
AbstractThe notion of a bead metric space defined here (see Definition 6) is a nice generalization o...
Based on Sperner's lemma the fixed point theorem of Brouwer is proved. Rather than presenting also o...
This thesis deals with images of compact convex sets under a continuous mapping. We will show a comb...
We define the infinite-dimensional simplex to be the closure of the convex hull of the standard basi...
AbstractWe define the infinite-dimensional simplex to be the closure of the convex hull of the stand...
A topological space has the fixed point property if every continuous self-map of that space has at l...
AbstractIt is shown that, in the sense of the Baire category, almost all continuous single valued α-...
(Communicated by A. Ebadian) A normed space X is said to have the fixed point property, if for each ...
A fixed point of a function f from a set X into itself is a point x0 satisfying f(x0) = x0. Theorem...
The familiar Brouwer fixed point theorem says that any continuous self-map f on a compact convex sub...
Summary. In this article we prove the Brouwer fixed point theorem for an arbitrary simplex which is ...
The main result of this paper is that a closed convex subset of a Banach space has the fixed point p...
AbstractA compact convex set X in a linear metric space is weakly admissible if for every ε > 0 ther...
We first present a generalization of ω⁎-Gâteaux differentiability theorems of Lipschitz mappings fro...
AbstractWe show that the fixed point set of a quasi-nonexpansive selfmap of a nonempty convex subset...
AbstractThe notion of a bead metric space defined here (see Definition 6) is a nice generalization o...
Based on Sperner's lemma the fixed point theorem of Brouwer is proved. Rather than presenting also o...
This thesis deals with images of compact convex sets under a continuous mapping. We will show a comb...
We define the infinite-dimensional simplex to be the closure of the convex hull of the standard basi...
AbstractWe define the infinite-dimensional simplex to be the closure of the convex hull of the stand...
A topological space has the fixed point property if every continuous self-map of that space has at l...
AbstractIt is shown that, in the sense of the Baire category, almost all continuous single valued α-...
(Communicated by A. Ebadian) A normed space X is said to have the fixed point property, if for each ...
A fixed point of a function f from a set X into itself is a point x0 satisfying f(x0) = x0. Theorem...
The familiar Brouwer fixed point theorem says that any continuous self-map f on a compact convex sub...
Summary. In this article we prove the Brouwer fixed point theorem for an arbitrary simplex which is ...
The main result of this paper is that a closed convex subset of a Banach space has the fixed point p...
AbstractA compact convex set X in a linear metric space is weakly admissible if for every ε > 0 ther...
We first present a generalization of ω⁎-Gâteaux differentiability theorems of Lipschitz mappings fro...
AbstractWe show that the fixed point set of a quasi-nonexpansive selfmap of a nonempty convex subset...
AbstractThe notion of a bead metric space defined here (see Definition 6) is a nice generalization o...
Based on Sperner's lemma the fixed point theorem of Brouwer is proved. Rather than presenting also o...
This thesis deals with images of compact convex sets under a continuous mapping. We will show a comb...