Fixed Points of the Josephus Function via Fractional Base Expansions
Abstract
In this paper, we investigate properties of the fixed point sequence of the Josephus function J3. First, we establish a connection between this sequence and the Chinese Remainder Theorem. Next, we identify a clear numerical pattern for the digits of two consecutive fixed points when they are written in a non-standard fractional number system in base 3/2. This result enables us to derive a recursive procedure for determining the digits of their base 3/2 expansions.
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