ABACABA pattern

The ABACABA pattern is a recursive fractal pattern that shows up in many places in the real world (such as in geometry, art, music, poetry, number systems, literature and higher dimensions).^[1]^[2]^[3]^[4] Patterns often show a DABACABA type subset. AA, ABBA, and ABAABA type forms are also considered.^[5]

Generating the pattern

In order to generate the next sequence, first take the previous pattern, add the next letter from the alphabet, and then repeat the previous pattern. The first few steps are listed here.^[4]

Step	Pattern	Letters
1	A	2¹ − 1 = 1
2	ABA	3
3	ABACABA	7
4	ABACABADABACABA	15
5	ABACABADABACABAEABACABADABACABA	31
6	ABACABADABACABAEABACABADABACABAFABACABADABACABAEABACABADABACABA	63

ABACABA is a "quickly growing word", often described as chiastic or "symmetrically organized around a central axis" (see: Chiastic structure and Χ).^[4] The number of members in each iteration is $a (n) = 2 n - 1$ , the Mersenne numbers (OEIS: A000225).

Gallery

Sierpinski triangle^[1]^[2]:

ABACABA
Ruler,^[1]^[2] excluding 1 and 2:

ABACABADABACABA
excluding 2:

EABACABADABACABA
Cantor set:

ABACABADABACABA
Binary tree^[1]^[2]/upside down family tree:

ABACABADABACABA
Koch curve:^[1] $n=1$ is ABA, $n=2$ is ABACABA, and $n=3$ : ABACABADABACABA
Metric hierarchy:

ABACABADABACABA^[a]
Metric levels:^[1]
EABACABADABACABA
When counting in binary (here 4-bit), the final 0s form an ABACABA pattern^[1]
A staircase with each box double the size of the previous one:
ABACABADABACABA^[1]
$A "circle fractal" superimposed with a 2 × 2 box fractal:$

A "circle fractal"^[1] superimposed with a $2 \times 2$ box fractal:
ABACABADABACABA
The Tower of Hanoi^[1] with four disks:
ABACABADABACABA
Binary tree array:
to O
Binary-reflected Gray code (BRGC):
to G
Rotary encoder:
to I
3-bit Gray code visualized as a traversal of vertices of a cube (0,1,3,2,6,7,5,4):^[1]
ABACABA
Double harmonic scale (Play) with steps of H-3H-H-W-H-3H-H:
ABACABA
Château de Chambord:
ABACABA^[6]
Gray code along the number line^[1] (OEIS: A003188):
ABACABADABACABAEABACABADABACABA
Devil's needle:^[1]
ABACABADABACABA
Size of hexagrams on a diagonal of a section of a Menger sponge model:
ABACABADABACABA

◦୦◦◯◦୦◦⠀       ⠀◦୦◦◯◦୦◦

Notes

^ The strength, emphasis, or importance of the beginning of each duration $1/8$ the length of a single measure in ⁴
₄ (eighth-notes) is, divisively ( $2/2^{1}=1$ , $4/2^{2}=1$ , $8/2^{3}=1$ ), determined by each eighth-note's position in a DABACABA structure, while the eighth notes of two measures grouped, additively ( $8\times 2=16$ ), are determined by an EABACABADABACABA structure.^[3]

References

^ Jump up to: ^a ^b ^c ^d ^e ^f ^g ^h ⁱ ^j ^k ^l ^m Naylor, Mike (February 2013). "ABACABA Amazing Pattern, Amazing Connections". Math Horizons. Retrieved June 13, 2019.
^ Jump up to: ^a ^b ^c ^d SheriOZ (2016-04-21). "Exploring Fractals with ABACABA". Chicago Geek Guy. Archived from the original on 22 January 2021. Retrieved January 22, 2021.
^ Jump up to: ^a ^b Naylor, Mike (2011). "Abacaba! – Using a mathematical pattern to connect art, music, poetry and literature" (PDF). Bridges. Retrieved October 6, 2017.
^ Jump up to: ^a ^b ^c Conley, Craig (2008-10-01). Magic Words: A Dictionary. Weiser Books. p. 53. ISBN 9781609250508.
^ Halter-Koch, Franz and Tichy, Robert F.; eds. (2000). Algebraic Number Theory and Diophantine Analysis, p.478. W. de Gruyter. ISBN 9783110163049.
^ Wright, Craig (2016). Listening to Western Music, p.48. Cengage Learning. ISBN 9781305887039.

External links

Naylor, Mike: abacaba.org

This fractal–related article is a stub. You can help Wikipedia by expanding it.

[6] The strength, emphasis, or importance of the beginning of each duration $1/8$ the length of a single measure in ⁴
₄ (eighth-notes) is, divisively ( $2/2^{1}=1$ , $4/2^{2}=1$ , $8/2^{3}=1$ ), determined by each eighth-note's position in a DABACABA structure, while the eighth notes of two measures grouped, additively ( $8\times 2=16$ ), are determined by an EABACABADABACABA structure.^[3]

[Naylor-1] Jump up to: ^a ^b ^c ^d ^e ^f ^g ^h ⁱ ^j ^k ^l ^m Naylor, Mike (February 2013). "ABACABA Amazing Pattern, Amazing Connections". Math Horizons. Retrieved June 13, 2019.

[Chicago-2] Jump up to: ^a ^b ^c ^d SheriOZ (2016-04-21). "Exploring Fractals with ABACABA". Chicago Geek Guy. Archived from the original on 22 January 2021. Retrieved January 22, 2021.

[Bridges-3] Jump up to: ^a ^b Naylor, Mike (2011). "Abacaba! – Using a mathematical pattern to connect art, music, poetry and literature" (PDF). Bridges. Retrieved October 6, 2017.

[Conley-4] Jump up to: ^a ^b ^c Conley, Craig (2008-10-01). Magic Words: A Dictionary. Weiser Books. p. 53. ISBN 9781609250508.

[5] Halter-Koch, Franz and Tichy, Robert F.; eds. (2000). Algebraic Number Theory and Diophantine Analysis, p.478. W. de Gruyter. ISBN 9783110163049.

[7] Wright, Craig (2016). Listening to Western Music, p.48. Cengage Learning. ISBN 9781305887039.

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[2]

[3]

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[a]

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Generating the pattern

Gallery

See also

Notes

References

External links