TY - JOUR
T1 - Using isometries for computational design and fabrication
AU - Jiang, Caigui
AU - Wang, Hui
AU - Inza, Victor Ceballos
AU - DELLINGER, FELIX
AU - Rist, Florian
AU - Wallner, Johannes
AU - Pottmann, Helmut
N1 - KAUST Repository Item: Exported on 2021-05-04
Acknowledgements: This work was supported by the Austrian Science Fund via grants I2978 (SFB-Transregio programme Discretization in geometry and
dynamics), W1230 (DK programme Discrete Mathematics) and F77 (SFB grant Advanced Computational Design). V. Ceballos, C. Jiang,
F. Rist, and H. Wang were supported by KAUST baseline funding.
PY - 2021
Y1 - 2021
N2 - We solve the task of representing free forms by an arrangement of panels that are manufacturable by precise isometric bending of surfaces made from a small number of molds. In fact we manage to solve the paneling task with surfaces of constant Gaussian curvature alone. This includes the case of developable surfaces which exhibit zero curvature. Our computations are based on an existing discrete model of isometric mappings between surfaces which for this occasion has been refined to obtain higher numerical accuracy. Further topics are interesting connections of the paneling problem with the geometry of Killing vector fields, designing and actuating isometries, curved
folding in the double-curved case, and quad meshes with rigid faces that are nevertheless flexible.
AB - We solve the task of representing free forms by an arrangement of panels that are manufacturable by precise isometric bending of surfaces made from a small number of molds. In fact we manage to solve the paneling task with surfaces of constant Gaussian curvature alone. This includes the case of developable surfaces which exhibit zero curvature. Our computations are based on an existing discrete model of isometric mappings between surfaces which for this occasion has been refined to obtain higher numerical accuracy. Further topics are interesting connections of the paneling problem with the geometry of Killing vector fields, designing and actuating isometries, curved
folding in the double-curved case, and quad meshes with rigid faces that are nevertheless flexible.
UR - http://hdl.handle.net/10754/669048
U2 - 10.1145/3450626.3459839
DO - 10.1145/3450626.3459839
M3 - Article
JO - Accepted by ACM Transactions on Graphics
JF - Accepted by ACM Transactions on Graphics
ER -