Skip to search form
Skip to main content
Skip to account menu
Semantic Scholar
Semantic Scholar's Logo
Search 225,166,816 papers from all fields of science
Search
Sign In
Create Free Account
Mandelbulb
Known as:
3D Mandelbulb
The Mandelbulb is a three-dimensional fractal, constructed by Daniel White and Paul Nylander using spherical coordinates in 2009. A canonical 3…
Expand
Wikipedia
(opens in a new tab)
Create Alert
Alert
Related topics
Related topics
5 relations
Fractal
Fractal art
Fractal-generating software
Mandelbox
Expand
Papers overview
Semantic Scholar uses AI to extract papers important to this topic.
2013
2013
A COMPLEX AND TRIPLEX FRAMEWORK FOR ENCODING THE RIEMANNIAN DUAL SPACE-TIME TOPOLOGY EQUIPPED WITH ORDER PARAMETER FIELDS
N. O. Schmidt
2013
Corpus ID: 16253056
In this work, we forge a powerful, easy-to-visualize, flexible, consistent, and disciplined abstract vector framework for…
Expand
2013
2013
Un ensemble de Julia brumeux dans l'ensemble des pseudo-octonions (comme un 'MandelBulb' : un 'JuliaBulb') calculé pour A=(-0.5815147625160462,+0.6358885017421603,0,0,0,0,0,0) -section…
J. Colonna
2013
Corpus ID: 125299680
A foggy pseudo-octonionic Julia set ('MandelBulb' like : a 'JuliaBulb') computed with A=(-0.5815147625160462,+0.6358885017421603…
Expand
2011
2011
Generation of 3D fractal images for Mandelbrot set
Bulusu Rama
,
J. Mishra
International Conference on Communication…
2011
Corpus ID: 15076817
Fractals provide an innovative method for generating 3D images of real-world objects by using computational modelling algorithms…
Expand
2011
2011
Agrandissement d'un ensemble de Mandelbrot dans l'ensemble des pseudo-octonions (un 'Mandelbulb') avec une transformation conforme 1/Z dans le plan complexe
J. Colonna
2011
Corpus ID: 124788753
Close-up on a pseudo-octonionic Mandelbrot set (a 'Mandelbulb') with a 1/Z conformal transformation in the complex plane…
Expand
2010
2010
Rendering the Mandelbulb
Robert G. Graf
International Conference on Computer Graphics and…
2010
Corpus ID: 38015586
This presentation identifies problems and solutions for rendering a Mandelbulb animation.
2010
2010
Un ensemble de Julia dans l'ensemble des pseudo-quaternions (comme un 'MandelBulb' : un 'JuliaBulb') calculé pour A=(-0.5815147625160462,0.6358885017421603,0,0)
J. Colonna
2010
Corpus ID: 190741228
A pseudo-quaternionic Julia set ('MandelBulb' like : a 'JuliaBulb') computed with A=(-0.5815147625160462,0.6358885017421603,0,0…
Expand
2010
2010
Un ensemble de Mandelbrot dans l'ensemble des pseudo-quaternions (un 'MandelBulb') -'la ronde des enfants' ou 'la conscience émergeant des Mathématiques'-
J. Colonna
2010
Corpus ID: 209874880
A pseudo-quaternionic Mandelbrot set (a 'MandelBulb') -'the children round' or 'the consciousness emerging from Mathematics'- (Un…
Expand
2010
2010
Agrandissement d'un ensemble de Mandelbrot dans l'ensemble des pseudo-quaternions (un 'Mandelbulb')
J. Colonna
2010
Corpus ID: 123384448
Close-up on a pseudo-quaternionic Mandelbrot set (a 'Mandelbulb') (Agrandissement d'un ensemble de Mandelbrot dans l'ensemble des…
Expand
2009
2009
Zoom sur un ensemble de Mandelbrot dans l'ensemble des pseudo-quaternions (un 'MandelBulb')
J. Colonna
2009
Corpus ID: 126250480
Zoom in on a pseudo-quaternionic Mandelbrot set (a 'MandelBulb') (Zoom sur un ensemble de Mandelbrot dans l'ensemble des pseudo…
Expand
2009
2009
Rotation de 2 pi autour de l'axe Y d'un ensemble de Mandelbrot dans l'ensemble des pseudo-quaternions (un 'MandelBulb')
J. Colonna
2009
Corpus ID: 125864826
2 pi rotation about the Y axis of a pseudo-quaternionic Mandelbrot set (a 'MandelBulb') (Rotation de 2 pi autour de l'axe Y d'un…
Expand
By clicking accept or continuing to use the site, you agree to the terms outlined in our
Privacy Policy
(opens in a new tab)
,
Terms of Service
(opens in a new tab)
, and
Dataset License
(opens in a new tab)
ACCEPT & CONTINUE