Steckin-Marchard-type inequalities for some Durrmeyer operators (Q2779077)

The authors consider the Bernstein-Durrmeyer \((c=-1)\) and Szász-Durrmeyer \((c=0)\) operators defined by NEWLINE\[NEWLINEM_n(f,x)= \sum^{+\infty}_{k=0} p_{n,k}(x) (n-c) \int_Ip_{n,k} (t)f(t)dt,\;x\in I,NEWLINE\]NEWLINE where NEWLINE\[NEWLINE\begin{aligned} p_{n,k}(x) & =(-1)^k{x^k \over k!}\varphi_n^{(k)}(x),\\ \varphi_n(x) & = \begin{cases} (1-x)^n,\quad & x\in [0,1]=I,\;c=-1,\\ e^{-nx}, \quad & x\in [0,+\infty)= I,\;c=0.\end{cases} \end{aligned}NEWLINE\]NEWLINE The main results are two Steckin-Marchaud-type inequalities involving a weighted modulus of smoothness and a corresponding \(K\)-functional, respectively. They lead, in particular, to some inverse results available in the literature.