On 19.02.2015 at 12:20 in S6, there is the following noon lecture:
Splitting spaces and their representation: Tilings from graphs and vice versa
Enumerating partitions of spaces can be a challenging task, especially if no order relationship is given. Using Delaney symbols, we ran a combinatorial search based on the computational tiling theory developed by Delaney, Delgado-Friedrichs, Dress and Huson aimed at the construction of periodic simple tilings of increasing complexity. Periodic tilings containing only tiles with 12 to 16 faces and 4, 5 and 6-sided faces have been considered. All Euclidean tilings with up to 11 crystallographically distinct kinds of vertices have been enumerated.
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