Gbachelier: Die Seite wurde neu angelegt: „ == Reference == Paul Gailiunas: Recursive Rosettes. In: Bridges 2014. Pages 127–134 == DOI == == Abstract == Recursively generated geometric str…“

2015-01-27T13:47:32Z

Die Seite wurde neu angelegt: „ == Reference == Paul Gailiunas: Recursive Rosettes. In: Bridges 2014. Pages 127–134 == DOI == == Abstract == Recursively generated geometric str…“

Neue Seite

== Reference ==
Paul Gailiunas: [[Recursive Rosettes]]. In: [[Bridges 2014]]. Pages 127–134

== DOI ==

== Abstract ==
Recursively generated geometric structures are usually something like a fractal: generally in the limit they will be
true fractals. At least one recursive function, which is actually very simple, can generate a wide range of non-
fractal cyclical structures with various visual characters. There are infinitely many such rosette structures, and it
is by no means certain that they have all been identified. (“Rosette” is used here in the general sense of a circular
rose-like pattern, rather than referring to classical rosette curves, which are related to epicycloids.) After an
analysis of the mathematical structure of the recursive function, methods of searching for the rosettes that it
generates are discussed.

== Extended Abstract ==

== Bibtex ==

== Used References ==
[1] Abelson H. and diSessa A., Turtle Geometry, MIT, 1980.

[2] Harvey B., Computer Science Logo Style, MIT, 1986.

== Links ==
=== Full Text ===
http://archive.bridgesmathart.org/2014/bridges2014-127.pdf

[[intern file]]

=== Sonstige Links ===
http://archive.bridgesmathart.org/2014/bridges2014-127.html

Recursive Rosettes - Versionsgeschichte

Gbachelier: Die Seite wurde neu angelegt: „ == Reference == Paul Gailiunas: Recursive Rosettes. In: Bridges 2014. Pages 127–134 == DOI == == Abstract == Recursively generated geometric str…“