Golomb sequence - Alchetron, The Free Social Encyclopedia

In mathematics, the Golomb sequence, named after Solomon W. Golomb (but also called Silverman's sequence), is a non-decreasing integer sequence where a_n is the number of times that n occurs in the sequence, starting with a₁ = 1, and with the property that for n > 1 each a_n is the unique integer which makes it possible to satisfy the condition. For example, a₁ = 1 says that 1 only occurs once in the sequence, so a₂ cannot be 1 too, but it can be, and therefore must be, 2. The first few values are

Examples

a₁ = 1
Therefore, 1 occurs exactly one time in this sequence.

a₂ > 1
a₂ = 2

2 occurs exactly 2 times in this sequence.
a₃ = 2

3 occurs exactly 2 times in this sequence.

a₄ = a₅ = 3

4 occurs exactly 3 times in this sequence.
5 occurs exactly 3 times in this sequence.

a₆ = a₇ = a₈ = 4
a₉ = a₁₀ = a₁₁ = 5

etc.

Recurrence

Colin Mallows has given an explicit recurrence relation a ( 1 ) = 1 ; a ( n + 1 ) = 1 + a ( n + 1 − a ( a ( n ) ) ) . An asymptotic expression for a_n is

φ 2 − φ n φ − 1 ,

where φ is the golden ratio.

References

Golomb sequence Wikipedia

(Text) CC BY-SA

Contents

Examples

Recurrence

References