Back close

Analysis

The utilization of Bernstein polynomials in constructing and numerically integrating bivariate fractal interpolation functions is a prominent research focus. It involves the construction and numerical integration of these functions over various domains. Furthermore, a significant aspect of this field pertains to the fixed-point results derived for the sum of two operators and their application in solving differential equations. In a related context, the existence and uniqueness of a coupled best attractor for proximal Iterated Function Systems (IFS) are explored. This concept plays a fundamental role in understanding the behavior of fractal interpolations. Additionally, the investigation into the existence of common best proximity points within a topological space is a crucial topic. This endeavor aims to establish foundational principles and theorems in mathematical analysis and functional analysis, enhancing our understanding of these intricate mathematical concepts.

Keywords

  • Fractals
  • Fractal Interpolation Function
  • Best Proximity Point
  • Fixed Point

Team

Dr. V. Pragadeeswarar

Dr. V. Pragadeeswarar

Assistant Professor (Sl. Gr)

Dr. G. Poonguzali

Dr. G. Poonguzali

Assistant Professor (Sr. Gr)

No publications to display

No projects to display

Admissions Apply Now