English

The distance between two limit $q$-Bernstein operators

Functional Analysis 2018-01-08 v2

Abstract

For q(0,1),q\in(0,1), let BqB_q denote the limit qq-Bernstein operator. In this paper, the distance between BqB_q and BrB_r for distinct qq and rr in the operator norm on C[0,1]C[0,1] is estimated, and it is proved that 1BqBr2,1\leqslant \|B_q-B_r\|\leqslant 2, where both of the equalities can be attained. To elaborate more, the distance depends on whether or not rr and qq are rational powers of each other. For example, if rjqmr^j\neq q^m for all j,mN,j,m\in \mathbb{N}, then BqBr=2,\|B_q-B_r\|=2, and if r=qm,mN,r=q^m, m\in \mathbb{N}, then BqBr=2(m1)/m.\|B_q-B_r\|=2(m-1)/m.

Cite

@article{arxiv.1708.07669,
  title  = {The distance between two limit $q$-Bernstein operators},
  author = {Sofiya Ostrovska and Mehmet Turan},
  journal= {arXiv preprint arXiv:1708.07669},
  year   = {2018}
}

Comments

15 pages

R2 v1 2026-06-22T21:23:24.492Z