A quaternionic Julia set -tridimensional cross-section- (Un ensemble de Julia dans le corps des quaternions -section tridimensionnelle-) {a chapter of 'Mathematics - A Virtual Instrument For Exploring Space Time And Beyond'}

A quaternionic Julia set -tridimensional cross-section- [Un ensemble de Julia dans le corps des quaternions -section tridimensionnelle-].

See a set of 4x3 stereograms:

A set of 4x3 stereograms of the quaternionic Julia set computed with A=(-0.581514...,+0.635888...,0,0)-tridimensional cross-section-

See some autostereograms:

Autostereogram of a quaternionic Julia set -tridimensional cross-section-

True colors autostereogram of a quaternionic Julia set -tridimensional cross-section-

See its 2.pi rotation about the Y axis:

2.pi rotation about the Y axis of a quaternionic Julia set -tridimensional cross-sections-

See a translation along the fourth axis:

Translation along the fourth axis of a quaternionic Julia set -tridimensional cross-sections-

See a related picture:

The quaternionic Julia set -degree=2- computed with A=(-0.581514...,+0.635888...,0,0)-tridimensional cross-section-

(CMAP28 WWW site: this page was created on 02/26/1997 and last updated on 06/04/2026 22:40:45 -CEST-)

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Copyright © Jean-François COLONNA, 1997-2026.
Copyright © France Telecom R&D and CMAP (Centre de Mathématiques APpliquées) UMR CNRS 7641 / École polytechnique, Institut Polytechnique de Paris, 1997-2026.

Copyright © Jean-François COLONNA, 1997-2026. Copyright © France Telecom R&D and CMAP (Centre de Mathématiques APpliquées) UMR CNRS 7641 / École polytechnique, Institut Polytechnique de Paris, 1997-2026.

Copyright © Jean-François COLONNA, 1997-2026.
Copyright © France Telecom R&D and CMAP (Centre de Mathématiques APpliquées) UMR CNRS 7641 / École polytechnique, Institut Polytechnique de Paris, 1997-2026.