Abstract
Let n1 < n2 < … be the sequence of positive integers whose base b representations involve the digit t ≦ b —1 at most d—1 times. B. D. Craven [2] shows that Σi1/ni converges by giving an upper bound for this sum as a function of b and d.
Publisher
Cambridge University Press (CUP)
Cited by
4 articles.
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1. Kempner-like Harmonic Series;The American Mathematical Monthly;2024-08-12
2. Ellipsephic harmonic series revisited;Acta Mathematica Hungarica;2024-08
3. Sums of Reciprocals of Integers Missing a Given Digit;The American Mathematical Monthly;1979-05
4. A class of harmonically convergent sets;Journal of the Australian Mathematical Society;1975-11