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引用次数: 0
摘要
本研究旨在研究在 Durrmeyer 框架内与赫尔米特多项式相关联的 Szász 算子的广义版本。首先,我们利用 Peetre 的 K 函数以及经典和二阶连续性模量深入研究了它们的逼近特性。随后,我们利用 Lipschitz 型函数评估收敛速度,并建立 Voronovskaya 型近似定理。最后,我们研究了具有有界变化导数的可微函数的收敛速度。
Rate of convergence of Szász-Durrmeyer type operators involving Hermite polynomials
This study aims to investigate a generalized version of Szász operators linked with Hermite polynomials in the Durrmeyer framework. Initially, we delve into their approximation properties employing Peetre’s K-functional, along with classical and second-order modulus of continuity. Subsequently, we evaluate the convergence speed using a Lipschitz-type function and establish a Voronovskaya-type approximation theorem. Lastly, we investigate the convergence rate for differentiable functions with bounded variation derivatives.
期刊介绍:
Annali dell''Università di Ferrara is a general mathematical journal publishing high quality papers in all aspects of pure and applied mathematics. After a quick preliminary examination, potentially acceptable contributions will be judged by appropriate international referees. Original research papers are preferred, but well-written surveys on important subjects are also welcome.
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