| AN INTRODUCTION TO $\mathfrak{U}$-METRIC SPACE AND NON-LINEAR CONTRACTION WITH APPLICATION TO THE STABILITY OF FIXED POINT EQUATION |
| K. Roy, M. Saha, D. Dey |
Abstract In this paper, we introduce the notion of $U$-metric space of $n$-tuples which generalizes several known metric-type spaces. We study topological properties of such newly constructed spaces and prove Cantor's intersection-like theorem. Banach contraction principle theorem is proved in this space and we apply the theorem to obtain the stability of a fixed point equation.
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Keywords: $\mathfrak{U}$-metric space; Cantor's intersection like theorem; fixed point; stability of fixed point equation. |
MSC: 47H10, 54H25 |
Pages: 268--281 |
Volume 73 , Issue 4 , 2021 |
