Statistical convergence in metric spaces provides profound insights into sequence behaviors and their convergence properties. This understanding spans diverse disciplines, encompassing pure mathematics and applied sciences. By uncovering classical and modern frontiers, it catalyzes the development of advanced algorithms, predictive models, and transformative innovations. This exploration reshapes the utilization of sequential data in various fields, including computer science, engineering, and economics. The paper's focus lies in documenting classical as well as recent advancements in statistical convergence within metric spaces, establishing a bridge between theoretical comprehension and practical applications.
Author(s)details:-
Mr. Sumit Goel
Department of Mathematics, SUS Govt. College, Matak Majri, Karnal, Haryana,
India.
Please See the book
here :- https://doi.org/10.9734/bpi/mono/978-81-973809-6-9/CH10
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