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Main Authors: Volkov, Yurii, Volkov, Oleksandr, Voinalovych, Nataliia
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2512.07870
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author Volkov, Yurii
Volkov, Oleksandr
Voinalovych, Nataliia
author_facet Volkov, Yurii
Volkov, Oleksandr
Voinalovych, Nataliia
contents The paper examines the construction and analysis of a new class of mixed exponential statistical structures that combine the properties of stochastic models and linear positive operators. The relevance of the topic is driven by the growing need to develop a unified theoretical framework capable of describing both continuous and discrete random structures that possess approximation properties. The aim of the study is to introduce and analyze a generalized family of mixed exponential statistical structures and their corresponding linear positive operators, which include known operators as particular cases. We define auxiliary statistical structures B and H through differential relations between their elements, and construct the main Phillips-type structure. Recurrent relations for the central moments are obtained, their properties are established, and the convergence and approximation accuracy of the constructed operators are investigated. The proposed approach allows mixed exponential structures to be viewed as a generalization of known statistical systems, providing a unified analytical and stochastic description. The results demonstrate that mixed exponential statistical structures can be used to develop new classes of positive operators with controllable preservation and approximation properties. The proposed methodology forms a basis for further research in constructing multidimensional statistical structures, analyzing operators in weighted spaces, and studying their asymptotic characteristics.
format Preprint
id arxiv_https___arxiv_org_abs_2512_07870
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Mixed exponential statistical structures and their approximation operators
Volkov, Yurii
Volkov, Oleksandr
Voinalovych, Nataliia
Statistics Theory
41A36 (Primary) 41A25, 60E05, 47D03 (Secondary)
The paper examines the construction and analysis of a new class of mixed exponential statistical structures that combine the properties of stochastic models and linear positive operators. The relevance of the topic is driven by the growing need to develop a unified theoretical framework capable of describing both continuous and discrete random structures that possess approximation properties. The aim of the study is to introduce and analyze a generalized family of mixed exponential statistical structures and their corresponding linear positive operators, which include known operators as particular cases. We define auxiliary statistical structures B and H through differential relations between their elements, and construct the main Phillips-type structure. Recurrent relations for the central moments are obtained, their properties are established, and the convergence and approximation accuracy of the constructed operators are investigated. The proposed approach allows mixed exponential structures to be viewed as a generalization of known statistical systems, providing a unified analytical and stochastic description. The results demonstrate that mixed exponential statistical structures can be used to develop new classes of positive operators with controllable preservation and approximation properties. The proposed methodology forms a basis for further research in constructing multidimensional statistical structures, analyzing operators in weighted spaces, and studying their asymptotic characteristics.
title Mixed exponential statistical structures and their approximation operators
topic Statistics Theory
41A36 (Primary) 41A25, 60E05, 47D03 (Secondary)
url https://arxiv.org/abs/2512.07870