English

Polynomial approximations to continuous functions and stochastic compositions

Probability 2016-01-19 v1

Abstract

This paper presents a stochastic approach to theorems concerning the behavior of iterations of the Bernstein operator BnB_n taking a continuous function fC[0,1]f \in C[0,1] to a degree-nn polynomial when the number of iterations kk tends to infinity and nn is kept fixed or when nn tends to infinity as well. In the first instance, the underlying stochastic process is the so-called Wright-Fisher model, whereas, in the second instance, the underlying stochastic process is the Wright-Fisher diffusion. Both processes are probably the most basic ones in mathematical genetics. By using Markov chain theory and stochastic compositions, we explain probabilistically a theorem due to Kelisky and Rivlin, and by using stochastic calculus we compute a formula for the application of BnB_n a number of times k=k(n)k=k(n) to a polynomial ff when k(n)/nk(n)/n tends to a constant.

Keywords

Cite

@article{arxiv.1601.04483,
  title  = {Polynomial approximations to continuous functions and stochastic compositions},
  author = {Takis Konstantopoulos and Linglong Yuan and Michael A. Zazanis},
  journal= {arXiv preprint arXiv:1601.04483},
  year   = {2016}
}

Comments

21 pages, 5 figures

R2 v1 2026-06-22T12:31:36.656Z