Matrix representation for the beta type polynomials


Applied Mathematics and Information Sciences, vol.11, no.1, pp.183-187, 2017 (SCI-Expanded) identifier

  • Publication Type: Article / Article
  • Volume: 11 Issue: 1
  • Publication Date: 2017
  • Doi Number: 10.18576/amis/110122
  • Journal Name: Applied Mathematics and Information Sciences
  • Journal Indexes: Science Citation Index Expanded (SCI-EXPANDED), Scopus
  • Page Numbers: pp.183-187
  • Keywords: Bernstein polynomials, Beta polynomials, Generating functions, Linearly independent, Matrix representation, Partial differential equations, Polynomials, Simulation of the polynomials
  • Akdeniz University Affiliated: Yes


© 2017 NSP.The aim of this paper is to study and investigate some new properties of the beta polynomials. Taking derivative of the generating functions for beta type polynomials, we give two partial differential equations (PDEs). By using these PDEs, we derive derivative formulas of the beta type polynomials. In order to construct a matrix representation for the beta polynomials, we firstly show that the set of beta polynomials is linearly independent. By using linearly independent properties, we prove that any polynomial of degree less than and equal n are written as a linearly combination of the beta polynomials. Therefore, we define matrix representation for the beta polynomials. Moreover, we provide the simulation of the beta polynomials with some their graphs. We also give remarks and examples and comments on the beta polynomials and their matrix representation.