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Keywords:
2-Menger space; Cauchy sequence; fixed point; control function; $t$-norm
2-Menger space; Cauchy sequence; fixed point; control function; $t$-norm
Summary:
In this paper we introduce generalized cyclic contractions through $r$ number of subsets of a probabilistic 2-metric space and establish two fixed point results for such contractions. In our first theorem we use the Hadzic type $t$-norm. In another theorem we use a control function with minimum $t$-norm. Our results generalizes some existing fixed point theorem in 2-Menger spaces. The results are supported with some examples.
References:
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