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- Gyroid - Wikipedia
A gyroid is an infinitely connected triply periodic minimal surface discovered by Alan Schoen in 1970 [1][2] It arises naturally in polymer science and biology, as an interface with high surface area
- Gyroid -- from Wolfram MathWorld
The gyroid is the only known embedded triply periodic minimal surface with triple junctions In addition, unlike the five triply periodic minimal surfaces studied by Anderson et al (1990), the gyroid does not have any reflectional symmetries (Große-Brauckmann 1997)
- Meet the gyroid | plus. maths. org
What do butterflies, ketchup, microcellular structures, and plastics have in common? It's a curious minimal surface called the gyroid Figure 1: Two views of a section of the gyroid surface
- GYROID - SOUL OF MATHEMATICS
A gyroid structure is a distinct morphology that is triply periodic and consists of minimal iso-surfaces containing no straight lines The gyroid was discovered in 1970 by Alan Schoen, a NASA crystallographer interested in strong but light materials
- The Gyroid Triply Periodic Minimal Surface - Ken Brakke
Alan Schoen's gyroid surface is a triply periodic minimal surface that has no planes of symmetry and no embedded straight lines It does have C3 axes of symmetry (along one diagonal of the unit cell) and 4-fold roto-inversion axes
- EPINET Gyroid surface
The Gyroid The G surface or gyroid is a relative newcomer to the stable: it was discovered experimentally by Alan Schoen in the 1960's It is a remarkable structure, mathematically subtle and not readily amenable to the parametrisations used by Schwarz et al to derive the simpler P and D examples
- Gyroid – Minimal Surfaces
A main reason the Gyroid is so hard to visualize is the lack of straight lines or reflectional symmetry planes Slightly easier to comprehend are pieces of the Gyroid that lie in the associate family of the rP rD surface
- GYROID - MATHCURVE. COM
The gyroid is a triply periodic minimal surface the fundamental patch of which is reproduced opposite The two figures are based on the equation that gives a non-minimal surface close to the true gyroid The fundamental patch is composed of 8 isometric skew hexagons, six of which have a vertex at the center of the patch
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