Odd Fibbinary Numbers and the Golden Ratio

Published 5 Dec 2018 in math.CO | (1812.02107v1)

Abstract: The fibbinary numbers are positive integers whose binary representation contains no consecutive ones. We prove the following result: If the $j$th odd fibbinary is the $n$th \emph{odd} fibbinary number, then $j = \lfloor n\phi² \rfloor - 1.$

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