The aim of this paper is to study a bivariate version of the operator investigated in [2], [4]. We shall present Voronovskaya type theorem and theorems giving a rate of convergence of this operator. Some applications for the limit problem are indicated.
In this paper we will study some approximate properties of Baskakov-Durrmeyer type operators \(M_n^{\alpha,a}\). We determine the rate of convergence and prove the Voronovskaya type theorem for those operators.
Starting from a differential equation \(\frac{\partial}{\partial t} W (\lambda, t, u)=\frac{\lambda(u-t)}{p(t)}W(\lambda,t,u)-\beta W(\lambda,t,u)\) for the kernel of an operator \(S_\lambda(f,t) = \int_{A}^{B}W(\lambda,t,u)f(u)du\) with the normalization condition \(\int_A^B W(\lambda, t, u)du = 1\) we prove some properties which are similar to properties proved by Ismail and May for the exponential operators. In particular, we show that all these operators are approximation operators. Moreover, a method of determining \(S_\lambda\) for a given function \(p\) is introduced.
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