EGE 12TH INTERNATIONAL CONFERENCE ON APPLIED SCIENCES
INTEGRAL TYPE REICH CONTRACTIONS ON BIPOLAR p -METRIC SPACES
Yayıncı:
Academy Global Publishing House
Fixed-point theory is important because it provides foundational results applicable in various fields such as analysis, topology, and applied mathematics. It helps to understand the behavior of mathematical systems under specific conditions and is used in areas like differential equations, optimization, and game theory. Fixed-point theorems are powerful tools for proving the existence of solutions to complex problems and ensuring the stability of certain systems. One of the most studied areas of fixed-point theory is the generalization of the metric space being worked on. An example of these spaces is the concept of bipolar p -metric spaces. In this study, we define an integral type Reich contractive condition on bipolar p -metric spaces and provide a fixed-point theorem using this concept.
