Recamán's sequence

In mathematics and computer science, Recamán's sequence^[1][2] is a well known sequence defined by a recurrence relation. Because its elements are related to the previous elements in a straightforward way, they are often defined using recursion.

It takes its name after its inventor Bernardo Recamán Santos [es], a Colombian mathematician.

Definition

Recamán's sequence ${\displaystyle a_{0},a_{1},a_{2}\dots }$ is defined as:

${\displaystyle a_{n}={\begin{cases}0&&{\text{if }}n=0\\a_{n-1}-n&&{\text{if }}a_{n-1}-n>0{\text{ and is not already in the sequence}}\\a_{n-1}+n&&{\text{otherwise}}\end{cases}}}$

The first terms of the sequence are:

0, 1, 3, 6, 2, 7, 13, 20, 12, 21, 11, 22, 10, 23, 9, 24, 8, 25, 43, 62, 42, 63, 41, 18, 42, 17, 43, 16, 44, 15, 45, 14, 46, 79, 113, 78, 114, 77, 39, 78, 38, 79, 37, 80, 36, 81, 35, 82, 34, 83, 33, 84, 32, 85, 31, 86, 30, 87, 29, 88, 28, 89, 27, 90, 26, 91, 157, 224, 156, 225, 155, ...

On-line encyclopedia of integer sequences (OEIS)

Recamán's sequence was named after its inventor, Colombian mathematician Bernardo Recamán Santos, by Neil Sloane, creator of the On-Line Encyclopedia of Integer Sequences (OEIS). The OEIS entry for this sequence is A005132.

Visual representation

The most-common visualization of the Recamán's sequence is simply plotting its values, such as the figure at right.

On January 14, 2018, the Numberphile YouTube channel published a video titled The Slightly Spooky Recamán Sequence,^[3] showing a visualization using alternating semi-circles, as it is shown in the figure at top of this page.

Sound representation

"Recamán's sequence"

"Play Recamán's sequence."

Values of the sequence can be associated with musical notes, in such that case the running of the sequence can be associated with an execution of a musical tune.^[5]

Properties

The sequence satisfies:^[1]

${\displaystyle a_{n}\geq 0}$

${\displaystyle |a_{n}-a_{n-1}|=n}$

This is not a permutation of the integers: the first repeated term is ${\displaystyle 42=a_{24}=a_{20}}$.^[6] Another one is ${\displaystyle 43=a_{18}=a_{26}}$.

Conjecture

Neil Sloane has conjectured that every number eventually appears,^[7][8][9] but it has not been proved. Even though 10²³⁰ terms have been calculated (in 2018), the number 852,655 has not appeared on the list.^[1]

Uses

Besides its mathematical and aesthetic properties, Recamán's sequence can be used to secure 2D images by steganography.^[10]

Alternate sequence

The sequence is the most-known sequence invented by Recamán. There is another sequence, less known, defined as:

${\displaystyle a_{1}=1}$

${\displaystyle a_{n+1}={\begin{cases}a_{n}/n&&{\text{if }}n{\text{ divides }}a_{n}\\na_{n}&&{\text{otherwise}}\end{cases}}}$

This OEIS entry is A008336.

References

External links

• OEIS sequence A005132 (Recamán's sequence)
• The Slightly Spooky Recamán Sequence. (June 14, 2018) Numberphile on YouTube
• The Recamán's sequence at Rosetta Code

This page was last edited on 10 April 2024, at 02:22