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SUMMARY:Mountains\, Valleys and Volumetric Maximisation - Daniel Eatough\,
  PhD Candidate\, University of Cambridge
DTSTART:20180119T150000Z
DTEND:20180119T160000Z
UID:TALK98272@talks.cam.ac.uk
CONTACT:Karen Mitchell
DESCRIPTION:Folded thin shell surfaces\, or origami to the ancient Japanes
 e\, is characterised by mountain (convex) folds\, vally (concave) folds an
 d the intersections of these fold lines in the form of fold vertices. By c
 onsidering the spherical image of the different classes of fold vertex (or
  Vertex Roofs)\, equations can be derived\, which can then be used solve f
 or the folded up geometry of an arbitrary folding template\, in its folded
  up state. This technique is applied to the templates which fold up into e
 nclosed volumes\, and allows for maximum volumes to be found.
LOCATION:Cambridge University Engineering Department\, LR3A
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