Approximate fixed points for $n$-Linear functional by $(\mu,\sigma)$- nonexpansive Mappings on $n$-Banach spaces

https://doi.org/10.48185/jmam.v1i1.23

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Keywords:

$n$-linear functional, $n$-normed spaces, $n$-inner product spaces, $n$-Banach spaces, $(\mu,\sigma)$-nonexpansive mapping, Fixed point set.

Abstract

In this paper, we conclude that $n$-linear functionals spaces $\Im$ has approximate fixed points set, where $\Im$ is a non-empty bounded subset of an $n$-Banach space $H$ under the condition of equivalence, and we also use class of $(\mu,\sigma)$-nonexpansive mappings.

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Published

2020-12-03

How to Cite

Hardan, B., Patil, J. ., Bachhav, A. ., & Chaudhari, A. . (2020). Approximate fixed points for $n$-Linear functional by $(\mu,\sigma)$- nonexpansive Mappings on $n$-Banach spaces. Journal of Mathematical Analysis and Modeling, 1(1), 20–32. https://doi.org/10.48185/jmam.v1i1.23

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Articles