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Hauptverfasser: Singh, Digvijay, Shukla, Rahul, Singh, Karunesh Kumar
Format: Preprint
Veröffentlicht: 2025
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Online-Zugang:https://arxiv.org/abs/2506.12053
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author Singh, Digvijay
Shukla, Rahul
Singh, Karunesh Kumar
author_facet Singh, Digvijay
Shukla, Rahul
Singh, Karunesh Kumar
contents This article starts with the fundamental theory of stochastic type convergence and the significance of uniform integrability in the context of expectation value. A novel probabilistic sampling kantorovich (PSK-operators) is established with the help of classical sampling operators (SK-operators). We establish the proof of the fundamental theorem of approximation and a lemma corresponding to the PSK- operators. Moreover, some examples are illustrated not only in numerical form but also in a detailed study of some important features of an image at different samples. Eventually, a comparative analysis is made on the basis of some parameters like peak signal noise ratio (PSNR), structural similarity index (SSIM) etc. between the classical and probabilistic sense in tabulated form, which connects the whole dots of the theory present in the article.
format Preprint
id arxiv_https___arxiv_org_abs_2506_12053
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On a novel probabilistic Sampling Kantorovich operators and their application
Singh, Digvijay
Shukla, Rahul
Singh, Karunesh Kumar
General Mathematics
41A25, 41A35
This article starts with the fundamental theory of stochastic type convergence and the significance of uniform integrability in the context of expectation value. A novel probabilistic sampling kantorovich (PSK-operators) is established with the help of classical sampling operators (SK-operators). We establish the proof of the fundamental theorem of approximation and a lemma corresponding to the PSK- operators. Moreover, some examples are illustrated not only in numerical form but also in a detailed study of some important features of an image at different samples. Eventually, a comparative analysis is made on the basis of some parameters like peak signal noise ratio (PSNR), structural similarity index (SSIM) etc. between the classical and probabilistic sense in tabulated form, which connects the whole dots of the theory present in the article.
title On a novel probabilistic Sampling Kantorovich operators and their application
topic General Mathematics
41A25, 41A35
url https://arxiv.org/abs/2506.12053