Michel Dekking
Published 2019-06-20Version 1
In the base phi representation any natural number is written uniquely as a sum powers of the golden mean with digits 0 and 1, where one requires that the product of two consecutive digits is always 0. In this paper we give precise expressions for the those natural numbers for which the $k$th digit is 1, proving two conjectures for $k=0,1$. The expressions are all in terms of generalized Beatty sequences.
How to add two natural numbers in base phi
How to sum powers of balancing numbers efficiently
A type of the entropy of an ideal
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