The distance between two limit q-Bernstein operators
Abstract
For q∈(0,1), let Bq denote the limit q-Bernstein operator. In this paper, the distance between Bq and Br for distinct q and r in the operator norm on C[0,1] is estimated, and it is proved that 1≤slant \|Bq-Br\|≤slant 2, where both of the equalities can be attained. To elaborate more, the distance depends on whether or not r and q are rational powers of each other. For example, if rj≠ qm for all j,m∈ N, then \|Bq-Br\|=2, and if r=qm, m∈ N, then \|Bq-Br\|=2(m-1)/m.
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