Add to ORKGAbstract. Probabilistic fixed point theory has developed substantially during the last two decades. In this paper we define a new contraction in probabilistic metric spaces which are spaces in which distribution functions play the role of the metric. We have shown that under two separate conditions the mapping has a fixed point. Two illustrative examples are given
This paper investigates properties of convergence of distances of p-cyclic contractions on the union...
summary:In this paper we introduce generalized cyclic contractions through $r$ number of subsets of ...
In this paper, we consider the concept of probabilistic $(\epsilon,\lambda)$-local contraction which...
AbstractIn this paper the notion of contraction mappings on probabilistic metric spaces and probabil...
The purpose of this paper is to prove a fixed point theorem for a probabilistic k-contraction restri...
The intrinsic flexibility of probabilistic metric spaces makes it possible to extend the idea of con...
Abstract This work is for giving the probabilistic aspect to the known b-metric spaces (Czerwik in A...
In this paper, we will prove two theorems about existence of fixed point in (ϕ−k)−B contraction. We ...
Using the theory of countable exten-sion of t-norms we present some new classes of probabilistic con...
We give a probabilistic generalization of the theory of generalized metric spaces [2]. Then, we prov...
Abstract. Here we prove a probabilistic contraction mapping principle in Menger spaces. This is in l...
The notion of a contraction mapping for a probabilistic metric space recently introduced by T. L. Hi...
AbstractThe notion of a (Ψ,C)-contraction type multivalued mapping is introduced. This notion is a g...
Abstract. Here we prove a probabilistic contraction mapping principle in Menger spaces. This is in l...
This paper aims to prove fixed point results for cyclic compatible contraction and Hardy–Rogers cycl...
This paper investigates properties of convergence of distances of p-cyclic contractions on the union...
summary:In this paper we introduce generalized cyclic contractions through $r$ number of subsets of ...
In this paper, we consider the concept of probabilistic $(\epsilon,\lambda)$-local contraction which...
AbstractIn this paper the notion of contraction mappings on probabilistic metric spaces and probabil...
The purpose of this paper is to prove a fixed point theorem for a probabilistic k-contraction restri...
The intrinsic flexibility of probabilistic metric spaces makes it possible to extend the idea of con...
Abstract This work is for giving the probabilistic aspect to the known b-metric spaces (Czerwik in A...
In this paper, we will prove two theorems about existence of fixed point in (ϕ−k)−B contraction. We ...
Using the theory of countable exten-sion of t-norms we present some new classes of probabilistic con...
We give a probabilistic generalization of the theory of generalized metric spaces [2]. Then, we prov...
Abstract. Here we prove a probabilistic contraction mapping principle in Menger spaces. This is in l...
The notion of a contraction mapping for a probabilistic metric space recently introduced by T. L. Hi...
AbstractThe notion of a (Ψ,C)-contraction type multivalued mapping is introduced. This notion is a g...
Abstract. Here we prove a probabilistic contraction mapping principle in Menger spaces. This is in l...
This paper aims to prove fixed point results for cyclic compatible contraction and Hardy–Rogers cycl...
This paper investigates properties of convergence of distances of p-cyclic contractions on the union...
summary:In this paper we introduce generalized cyclic contractions through $r$ number of subsets of ...
In this paper, we consider the concept of probabilistic $(\epsilon,\lambda)$-local contraction which...