Comparison theorems for summability methods of sequences of fuzzy   numbers

Enes Yavuz

arXiv:1611.00387·math.CA·August 2, 2018·J. Intell. Fuzzy Syst.

Comparison theorems for summability methods of sequences of fuzzy numbers

Enes Yavuz

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TL;DR

This paper compares different summability methods for sequences of fuzzy numbers, including Cesàro, Euler, Abel, and Borel, and presents new results on series of fuzzy numbers.

Contribution

It introduces a comparative analysis of classical and power series summability methods specifically for fuzzy number sequences, along with new theoretical results.

Findings

01

Cesàro and Euler methods are compared with Abel and Borel methods.

02

New results on series of fuzzy numbers are established.

03

The paper provides insights into the relationships among various summability methods.

Abstract

In this study we compare Ces\`{a}ro and Euler weighted mean methods of summability of sequences of fuzzy numbers with Abel and Borel power series methods of summability of sequences of fuzzy numbers. Also some results dealing with series of fuzzy numbers are obtained.

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