New Generalizations of Set Valued Interpolative Hardy-Rogers Type Contractions in b-Metric Spaces
Muhammad Usman Ali, Hassen Aydi, Monairah Alansari
Abstract
Debnath and De La Sen introduced the notion of set valued interpolative Hardy-Rogers type contraction mappings on b-metric spaces and proved that on a complete b-metric space, whose all closed and bounded subsets are compact, the set valued interpolative Hardy-Rogers type contraction mapping has a fixed point. This article presents generalizations of above results by omitting the assumption that all closed and bounded subsets are compact.
Topics & Concepts
MathematicsMetric spaceBounded functionContraction (grammar)Hardy spaceCompact spaceType (biology)Closed setPure mathematicsComplete metric spaceSet (abstract data type)Space (punctuation)Discrete mathematicsMathematical analysisComputer scienceInternal medicineOperating systemBiologyMedicineEcologyProgramming languageFixed Point Theorems Analysis