Akademik Veri Yönetim Sistemi
Demonstratio Mathematica, cilt.58, sa.1, 2025 (SCI-Expanded)
Bede et al. (B. Bede, L. Coroianu, and S. G. Gal, Approximation and shape preserving properties of the nonlinear Meyer-König and Zeller operator of max-product kind, Numer. Funct. Anal. Optim. 31 (2010), no. 3, 232-253) defined the max-product Meyer-König and Zeller operator. They examined the approximation and shape preserving properties of this operator, and they found the order of approximation to be y ( − y) m 1 by the modulus of continuity and claimed that this order of approximation could only be improved in certain subclasses of the functions. In contrast to this claim, we demonstrate that we can obtain a better order of approximation without reducing the function class (by the classical modulus of continuity). We find the degree of approximation to be ( − ) − y y m 1 α α 1 1 1 , α = 2, 3,…. Since 1 − α 1 tends to 1 for enough big α, we improve this degree of approximation.