Anna Dushistova
Published 2005-12-27, updated 2007-12-15Version 3
Let $ p_{i, n}, i=1,..., N(n)=2^{n-1} $ be the lengths of intervals between the neighboring fractions of Brocot sequence $ F_n $. We obtain an asymptotic formula for $\sigma_{\beta}(F_n)=\sum_{i=1}^{N(n)} p_{i, n}^{\beta} $,which improves known estimates.
Asymptotics of the number of partitions into p-cores and some trigonometric sums
Partitions with parts in a finite set
On the asymptotic formula of L'(1, χ)
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