In this chapter, we explore the historical development of the significant results surrounding λ -Bernstein operators within the field of approximation theory. The primary objective of this study is to review the progress in this area and evaluate both the rapidity of convergence, using the modulus of continuity, and the rate of convergence, utilizing Lipschitz functions and Peetre’s K-functional. Operator theory has garnered considerable interest over the past two decades, largely due to the widespread applicability of Bernstein polynomials in approximation theory. These polynomials are now integral to numerous fields, including fixed point theory, numerical analysis, image processing, neural networks, machine learning, and the solution of both ordinary and partial differential equations. This chapter also highlights a few significant outcomes and includes the authors’ pertinent opinions, tracing the development of these operators from their inception to the present day.
Author (s) Details
Mohd Raiz
Department of Applied Sciences, Global Institute of Technology and
Management, 5KM Milestone, Kheda Khurampur, Farrukhnagar, Haily Mandi Road,
Gurugramn, Haryana-122506, India.
Nadeem Rao
Department of Mathematics, University Center for Research and Development,
Chandigarh University, Mohali, Punjab-140413, India.
Vishnu Narayan Mishra
Department of Mathematics, Indira Gandhi National Tribal University,
Lalpur, Amarkantak, Madhya Pradesh 484 887, India.
Please see the book here:- https://doi.org/10.9734/bpi/mono/978-93-48859-02-0/CH11
No comments:
Post a Comment