Monday, February 13, 2012

1202.2240 (Franz Gaehler et al.)

Integral cohomology of rational projection method patterns    [PDF]

Franz Gaehler, John Hunton, Johannes Kellendonk
We study the cohomology and hence K-theory of the aperiodic tilings formed by
the so called `cut and project' method, i.e., patterns in d dimensional
Euclidean space which arise as sections of higher dimensional, periodic
structures. They form one of the key families of patterns used in quasicrystal
physics, where their topological invariants carry quantum mechanical
information. Our work develops both a theoretical framework and a practical
toolkit for the discussion and calculation of their integral cohomology, and
extends previous work that only successfully addressed rational cohomological
invariants. Our framework unifies the several previous methods used to study
the cohomology of these patterns. We obtain explicit calculational results for
the main examples of icosahedral patterns in R^3 -- the Danzer tiling, the
Ammann-Kramer tiling and the Canonical and Dual Canonical D_6 tilings -- as
well as results for many of the better known 2 dimensional examples.
View original: http://arxiv.org/abs/1202.2240

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