On a theorem of Mahler

Meher, N.; Senthil Kumar, K.; Thangadurai, R.

doi:10.1090/proc/13616

On a theorem of Mahler
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by N. K. Meher, K. Senthil Kumar and R. Thangadurai PDF

Proc. Amer. Math. Soc. 145 (2017), 4607-4615 Request permission

Abstract:

Let $b\geq 2$ be an integer and $\alpha$ a non-zero real number written in base $b$. In 1973, Mahler proved the following result: Let $\alpha$ be an irrational number written in base $b$ and let $n\geq 1$ be a given integer. Let $B = b_0b_1\ldots b_{n-1}$ be a given block of digits in base $b$ of length $n$. Then, there exists an integer $X$ with $1\leq X < b^{2n+1}$ such that $B$ occurs infinitely often in the base $b$ representation of the fractional part of $X\alpha$. In this short note, we deal with some conditional quantitative version of this result.

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