Add to ORKGtextThis paper develops a new cohomology theory on generalized tiling spaces. This theory incorporates both the rotational geometry of the tiling space and the local pattern geometry into the structure of the cohomology groups. Our use of the local pattern geometry is a generalization of pattern-equivariant cohomology, a theory developed by Ian Putnam and Johannes Kellendonk in 2003. It was defined for tilings whose tiles appear as translates. The most general setting in tiling theory is to work with tiling spaces, with an action of a subgroup of the Euclidean group. This paper defines a new, general pattern-equivariant cohomology for tiling spaces with finite rotation groups, and proves that it is preserved under homeomorphisms wh...
We study the rotational structures of aperiodic tilings in Euclidean space of arbitrary dimension us...
AbstractWe establish direct isomorphisms between different versions of tiling cohomology. The first ...
This is the second paper in a short series devoted to the study and application of topological invar...
Abstract. Pattern-equivariant (PE) cohomology is a well established tool with which to in-terpret th...
Pattern-equivariant (PE) cohomology is a well-established tool with which to interpret the Čech coho...
In 2003, Johannes Kellendonk and Ian Putnam introduced pattern equivariant cohomology for tilings. I...
Pattern-equivariant (PE) cohomology is a well-established tool with which to interpret the Čech coho...
We explain from the basics why the Čech cohomology of a tiling space can be realised in terms of gro...
We show that two topological conjugate tiling spaces are, in general, not mutually locally derivable...
A spectral sequence is defined which converges to the Čech cohomology of the Euclidean hull of a til...
We study the rotational structures of aperiodic tilings in Euclidean space of arbitrary dimension us...
A spectral sequence is defined which converges to the Čech cohomology of the Euclidean hull of a til...
Aperiodic tilings are interesting to mathematicians and scientists for both theoretical and practica...
Let Ω be a tiling space and let G be the maximal group of rotations which fixes Ω. Then the cohomolo...
We study the rotational structures of aperiodic tilings in Euclidean space of arbitrary dimension us...
We study the rotational structures of aperiodic tilings in Euclidean space of arbitrary dimension us...
AbstractWe establish direct isomorphisms between different versions of tiling cohomology. The first ...
This is the second paper in a short series devoted to the study and application of topological invar...
Abstract. Pattern-equivariant (PE) cohomology is a well established tool with which to in-terpret th...
Pattern-equivariant (PE) cohomology is a well-established tool with which to interpret the Čech coho...
In 2003, Johannes Kellendonk and Ian Putnam introduced pattern equivariant cohomology for tilings. I...
Pattern-equivariant (PE) cohomology is a well-established tool with which to interpret the Čech coho...
We explain from the basics why the Čech cohomology of a tiling space can be realised in terms of gro...
We show that two topological conjugate tiling spaces are, in general, not mutually locally derivable...
A spectral sequence is defined which converges to the Čech cohomology of the Euclidean hull of a til...
We study the rotational structures of aperiodic tilings in Euclidean space of arbitrary dimension us...
A spectral sequence is defined which converges to the Čech cohomology of the Euclidean hull of a til...
Aperiodic tilings are interesting to mathematicians and scientists for both theoretical and practica...
Let Ω be a tiling space and let G be the maximal group of rotations which fixes Ω. Then the cohomolo...
We study the rotational structures of aperiodic tilings in Euclidean space of arbitrary dimension us...
We study the rotational structures of aperiodic tilings in Euclidean space of arbitrary dimension us...
AbstractWe establish direct isomorphisms between different versions of tiling cohomology. The first ...
This is the second paper in a short series devoted to the study and application of topological invar...