Conformable fractional approximation by max-product operators


Here we study the approximation of functions by a big variety of Maxproduct operators under conformable fractional differentiability. These are positive sublinear operators. Our study is based on our general results about positive sublinear operators. We produce Jackson type inequalities under conformable fractional initial conditions. So our approach is quantitative by producing inequalities with their right hand sides involving the modulus of continuity of a high order conformable fractional derivative of the function under approximation.

Publication Title

Studia Universitatis Babes-Bolyai Mathematica