Results 41 to 50 of about 5,419 (274)

Bicontinuous minimal surface nanostructures for polymer blend solar cells [PDF]

, 2010
This paper presents the first examination of the potential for bicontinuous structures such as the gyroid structure to produce high efficiency solar cells based on conjugated polymers.
Alison B. Walker, Athanasopoulos, Athanasopoulos, Barker, Bates, Brabec, Brown, Buxton, Campbell, Chiba, Crossland, Crossland, Douglas J. Cleaver, Ellison, Frost, Gerd E. Schröder-Turk, Groves, Groves, Grätzel, Günes, Günes, Hajduk, Huang, Hyde, Impéror-Clerc, Khan, Kietzke, Kietzke, Kim, Ko, Koster, Lee, Ma, Marcus, Markov, Marsh, Marsh, Martin, May, McNeill, McNeill, McNeill, Meng, Mickel, Moons, Morteani, Oey, Reyes-Reyes, Robin G. E. Kimber, Schoen, Schröder, Schröder-Turk, Schwarz, Sun, Sun, Tan, Thovert, Urade, van Duren, Watkins, Williams, Wolf, Yang, Zhang   +63 more
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An orthorhombic deformation family of Schwarz' H surfaces

, 2020
The classical H surfaces of H. A. Schwarz form a 1-parameter family of triply periodic minimal surfaces (TPMS) that are usually described as close relatives to his more famous P surface. However, a crucial distinction between these surfaces is that the P
Chen, Hao, Weber, Matthias
core   +1 more source

Triply-Periodic Smectics [PDF]

, 2006
Twist-grain-boundary phases in smectics are the geometrical analogs of the Abrikosov flux lattice in superconductors. At large twist angles, the nonlinear elasticity is important in evaluating their energetics.
Kamien, Randall D., Santangelo, Christian D.   +1 more
core   +4 more sources

The noncommutative geometry of wire networks from triply periodic surfaces

, 2012
We study wire networks that are the complements of triply periodic minimal surfaces. Here we consider the P, D, G surfaces which are exactly the cases in which the corresponding graphs are symmetric and self-dual.
Kaufmann, Ralph M., Khlebnikov, Sergei, Wehefritz-Kaufmann, Birgit   +2 more
core   +1 more source

Stability of bicontinuous cubic phases in ternary amphiphilic systems with spontaneous curvature [PDF]

, 1999
We study the phase behavior of ternary amphiphilic systems in the framework of a curvature model with non-vanishing spontaneous curvature. The amphiphilic monolayers can arrange in different ways to form micellar, hexagonal, lamellar and various ...
Anderson D. M., Anderson D. M., Bruinsma R., Düsing P. M., Fischer W., Fodgen A., G. Gompper, Gompper G., Gompper G., Gompper G., Große-Brauckmann K., Helfrich W., Karcher H., Leaver M. S., Räler J. O., U. S. Schwarz   +15 more
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Electronic structure of an electron on the gyroid surface, a helical labyrinth

, 2005
Previously reported formulation for electrons on curved periodic surfaces is used to analyze the band structure of an electron bound on the gyroid surface (the only triply-periodic minimal surface that has screw axes).
A. Carlsson, H. Aoki, H. Aoki, H. Terrones, M. Koshino, V. Heine, W. Fischer   +6 more
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Cubic Polyhedra [PDF]

, 2002
A cubic polyhedron is a polyhedral surface whose edges are exactly all the edges of the cubic lattice. Every such polyhedron is a discrete minimal surface, and it appears that many (but not all) of them can be relaxed to smooth minimal surfaces (under an
Goodman-Strauss, Chaim, Sullivan, John M
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Mean survival times of absorbing triply periodic minimal surfaces

Physical Review E, 2009
14 pages, 5 figures, 1 ...
Gevertz, J., Torquato, S.
openaire   +3 more sources

Evaluation of Cellular Solids Derived From Triply Periodic Minimal Surfaces [PDF]

Volume 2: Materials; Biomanufacturing; Properties, Applications and Systems; Sustainable Manufacturing, 2016
Cellular solids are a class of materials that have many interesting engineering applications, including ultralight structural materials [1]. The traditional method for analyzing these solids uses convex uniform polyhedral honeycombs to represent the geometry of the material [2], and this approach has carried over into the design of digital cellular ...
Cellucci, Daniel, Cheung, Kenneth C.
openaire   +2 more sources

A Variational Level Set Approach for Surface Area Minimization of Triply Periodic Surfaces

, 2006
In this paper, we study triply periodic surfaces with minimal surface area under a constraint in the volume fraction of the regions (phases) that the surface separates.
Alexandrov, Anderson, Boyd, Gandy, Grosse-Brauckmann, Grosse-Brauckmann, Góźdź, Hildebrand, Hornung, Jung, K.T. Chu, Klinowski, Landh, Lord, Mackay, National Research Council, Nitsche, Olmstead, Osher, Osher, S. Torquato, Schwarz, Schwarz, Sethian, Torquato, Torquato, Torquato, Torquato, von Schnering, Y. Jung, Yunfeng, Zhao, Ziherl, Zohdi, Zohdi   +34 more
core   +2 more sources