Add to ORKGsummary:We study best approximation in $p$-normed spaces via a general common fixed point principle. Our results unify and extend some known results of Carbone [ca:pt], Dotson [do:bs], Jungck and Sessa [ju:at], Singh [si:at] and many of others
AbstractThis paper is concerned with nonlinear optimization problems in normed linear spaces. Necess...
Working in Bishop’s constructive mathematics, we first show that minima can be defined as best ...
summary:Some existence results on best approximation are proved without starshaped subset and affine...
summary:We study best approximation in $p$-normed spaces via a general common fixed point principle....
summary:We study best approximation in $p$-normed spaces via a general common fixed point principle....
summary:Some existence results on best approximation are proved without starshaped subset and affine...
AbstractA common fixed-point generalization of the results of Dotson, Tarafdar, and Taylor is obtain...
We examine best approximation by closed sets in a class of normed spaces with star-shaped cones. It ...
The purpose of this paper is to introduce and discuss the concept of best approximation and best coa...
Abstract: We studied the best approximation between two sets in probabilistic normed spaces. We defi...
In [6], C. Dierick deals with a small but important collection of norms in the product of a finite n...
In [6], C. Dierick deals with a small but important collection of norms in the product of a finite n...
AbstractUsing a fixed-point theorem of G. Jungck [Math. Mag. 49, No. 1 (1976), 32–34], we generalize...
In this paper, we prove some results concerning the existence of invariant best approximation in Ban...
AbstractA historical account is given of the development of methods for solving approximation proble...
AbstractThis paper is concerned with nonlinear optimization problems in normed linear spaces. Necess...
Working in Bishop’s constructive mathematics, we first show that minima can be defined as best ...
summary:Some existence results on best approximation are proved without starshaped subset and affine...
summary:We study best approximation in $p$-normed spaces via a general common fixed point principle....
summary:We study best approximation in $p$-normed spaces via a general common fixed point principle....
summary:Some existence results on best approximation are proved without starshaped subset and affine...
AbstractA common fixed-point generalization of the results of Dotson, Tarafdar, and Taylor is obtain...
We examine best approximation by closed sets in a class of normed spaces with star-shaped cones. It ...
The purpose of this paper is to introduce and discuss the concept of best approximation and best coa...
Abstract: We studied the best approximation between two sets in probabilistic normed spaces. We defi...
In [6], C. Dierick deals with a small but important collection of norms in the product of a finite n...
In [6], C. Dierick deals with a small but important collection of norms in the product of a finite n...
AbstractUsing a fixed-point theorem of G. Jungck [Math. Mag. 49, No. 1 (1976), 32–34], we generalize...
In this paper, we prove some results concerning the existence of invariant best approximation in Ban...
AbstractA historical account is given of the development of methods for solving approximation proble...
AbstractThis paper is concerned with nonlinear optimization problems in normed linear spaces. Necess...
Working in Bishop’s constructive mathematics, we first show that minima can be defined as best ...
summary:Some existence results on best approximation are proved without starshaped subset and affine...