Approximation by using the Meyer-König and Zeller operators based on (p, q)-analogue


Uğur Kadak, Asif Khan, M Mursaleen




In this paper, a generalization of the q-Meyer-K ¨ onig and Zeller operators by means of the (p, q)-calculus is introduced. Some approximation results for (p, q)-analogue of Meyer-König and Zeller operators denoted by M n,p,q for 0 < q < p ≤ 1 are obtained. Also we investigate classical and statistical versions of Korovkin type approximation results based on proposed operator. Furthermore, some graphical examples for convergence of the operators are presented