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JOURNALS // Discrete & Computational Geometry // Archive

Discrete Comput. Geom., 2014, Volume 51, Issue 3, Pages 650–665 (Mi dcg2)

This article is cited in 1 paper

Deformations of period lattices of flexible polyhedral surfaces

A. A. Gaifullinabcd, S. A. Gaifullince

a Demidov Yaroslavl State University, Yaroslavl, Russia
b Steklov Mathematical Institute, Moscow, Russia
c Lomonosov Moscow State University, Moscow, Russia
d Kharkevich Institute for Information Transmission Problems, Moscow, Russia
e Higher School of Economics, Moscow, Russia

Abstract: At the end of the 19th century Bricard discovered the phenomenon of flexible polyhedra, that is, polyhedra with rigid faces and hinges at edges that admit nontrivial flexes. One of the most important results in this field is a theorem of Sabitov, asserting that the volume of a flexible polyhedron is constant during the flexion. In this paper we study flexible polyhedral surfaces in $\mathbb{R}^3$, doubly periodic with respect to translations by two non-collinear vectors, that can vary continuously during the flexion. The main result is that the period lattice of a flexible doubly periodic surface that is homeomorphic to the plane cannot have two degrees of freedom.

Received: 02.06.2013
Revised: 13.01.2014
Accepted: 18.01.2014

Language: English

DOI: 10.1007/s00454-014-9575-8



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