2017
DOI: 10.1112/blms.12098
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Cohomology of rotational tiling spaces

Abstract: A spectral sequence is defined which converges to the \v{C}ech cohomology of the Euclidean hull of a tiling of the plane with Euclidean finite local complexity. The terms of the second page are determined by the so-called ePE homology and ePE cohomology groups of the tiling, and the only potentially non-trivial boundary map has a simple combinatorial description in terms of its local patches. Using this spectral sequence, we compute the \v{C}ech cohomology of the Euclidean hull of the Penrose tilings.Comment: … Show more

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Cited by 4 publications
(18 citation statements)
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“…The above examples show that ePE Poincaré duality can fail in the presence of non-trivial rotational symmetry. We consider the discrepancy between the ePE homology and ePE cohomology to be a feature of interest, and it will be of relevance in forthcoming work on the cohomology of Euclidean hulls [42]. However,…”
Section: Restoring Poincaré Dualitymentioning
confidence: 99%
See 1 more Smart Citation
“…The above examples show that ePE Poincaré duality can fail in the presence of non-trivial rotational symmetry. We consider the discrepancy between the ePE homology and ePE cohomology to be a feature of interest, and it will be of relevance in forthcoming work on the cohomology of Euclidean hulls [42]. However,…”
Section: Restoring Poincaré Dualitymentioning
confidence: 99%
“…Furthermore, the method provides explicit generators in terms of pattern-equivariant chains. The result for the ePE homology of the Penrose tiling, along with precise descriptions of the generators of the ePE homology, will be essential in forthcoming work [42].…”
Section: 2mentioning
confidence: 99%
“…Nevertheless, with a few notable exceptions, such as [4,21,25,26,33,36], and see also [3], the topological study to date has largely been confined to the analogue of the translational symmetries for aperiodic patterns. This is perhaps surprising as many of the most interesting examples display apparent strong rotational or reflective organisation.…”
Section: Introductionmentioning
confidence: 99%
“…Just as Ω, the continuous, or what we shall now refer to as the translational, hull, denoting it by Ω t , can be considered as a certain completion of the space of translates of the pattern, the rotational hull Ω r is the corresponding completion of the set of all Euclidean motions of T . The space Ω r has been considered before, but by and large only for 2-dimensional patterns [5,30,36].…”
Section: Introductionmentioning
confidence: 99%
“…Pattern Equivariant cohomology [15,22] has proved a useful alternative approach, yielding the same algebraic invariant as the Cech theory, but in a way that elements can be realised in terms of geometric patches of T . A homological variant [25] shows that tiling spaces satisfy a Poincaré duality property analogous to that of manifolds, and has offered computational advantage, for example in the study of spaces remembering the symmetries of T [26].…”
mentioning
confidence: 99%