*STOCHASTIC convergence, *LINEAR operators, *MATHEMATICS, *FIXED point theory, *NONLINEAR operators
Abstract
In this paper, we focus on the existence of the best proximity points in binormed linear spaces. As a consequence, we obtain some fixed point results. We also provide some illustrations to support our claims. As applications, we obtain the existence of a solution to split feasible and variational inequality problems. [ABSTRACT FROM AUTHOR]
*IGNORANCE (Theory of knowledge), *THEORY of knowledge, *STOCHASTIC convergence, *BERNSTEIN polynomials, *POLYNOMIALS
Abstract
In this paper, when approximating a continuos non-negative function on the unit interval, we present an alternative way to the classical Bernstein polynomials. Our new operators become nonlinear, however, for some classes of functions, they provide better error estimations than the Bernstein polynomials. Furthermore, we obtain a simultaneous approximation result for these operators. [ABSTRACT FROM AUTHOR]