Non-Commutative Geometrical Aspects and Topological Invariants of a Conformally Regular Pentagonal Tiling of the Plane

Publikation: Bog/antologi/afhandling/rapportPh.d.-afhandlingForskning

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Non-Commutative Geometrical Aspects and Topological Invariants of a Conformally Regular Pentagonal Tiling of the Plane. / Ramirez-Solano, Maria.

Department of Mathematical Sciences, Faculty of Science, University of Copenhagen, 2013. 136 s.

Publikation: Bog/antologi/afhandling/rapportPh.d.-afhandlingForskning

Harvard

Ramirez-Solano, M 2013, Non-Commutative Geometrical Aspects and Topological Invariants of a Conformally Regular Pentagonal Tiling of the Plane. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen. <https://soeg.kb.dk/permalink/45KBDK_KGL/fbp0ps/alma99122889439905763>

APA

Ramirez-Solano, M. (2013). Non-Commutative Geometrical Aspects and Topological Invariants of a Conformally Regular Pentagonal Tiling of the Plane. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen. https://soeg.kb.dk/permalink/45KBDK_KGL/fbp0ps/alma99122889439905763

Vancouver

Ramirez-Solano M. Non-Commutative Geometrical Aspects and Topological Invariants of a Conformally Regular Pentagonal Tiling of the Plane. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen, 2013. 136 s.

Author

Ramirez-Solano, Maria. / Non-Commutative Geometrical Aspects and Topological Invariants of a Conformally Regular Pentagonal Tiling of the Plane. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen, 2013. 136 s.

Bibtex

@phdthesis{d856294f52384dc9909b32913fb89f35,
title = "Non-Commutative Geometrical Aspects and Topological Invariants of a Conformally Regular Pentagonal Tiling of the Plane",
abstract = "The article ”A regular pentagonal tiling of the plane” by Philip L. Bowers and Kenneth Stephenson defines a conformal pentagonal tiling. This is a tiling of the plane with remarkable combinatorial and geometric properties.However, it doesn{\textquoteright}t have finite local complexity in any usual sense, and therefore we cannot study it with the usual tiling theory. The appeal of the tiling is that all the tiles are conformally regular pentagons. But conformal maps are not allowable under finite local complexity. On the other hand, the tiling can be described completely by its combinatorial data, which rather automatically has finite local complexity. In this thesis we give a construction of the continuous and discrete hull just from the combinatorial data.For the discrete hull we construct a C-algebra and a measure. Since this tiling possesses no natural R2 action by translation, there is no a priori reason to expect that the K-theory of the C-algebra of the tiling is the same as the K-theory or cohomology of the hull. So it would be very interesting to know the outcome. For the continuous hull, we compute its K-theory and an absolute continuous invariant measure ",
author = "Maria Ramirez-Solano",
year = "2013",
language = "English",
isbn = "978-87-7078-994-3",
publisher = "Department of Mathematical Sciences, Faculty of Science, University of Copenhagen",

}

RIS

TY - BOOK

T1 - Non-Commutative Geometrical Aspects and Topological Invariants of a Conformally Regular Pentagonal Tiling of the Plane

AU - Ramirez-Solano, Maria

PY - 2013

Y1 - 2013

N2 - The article ”A regular pentagonal tiling of the plane” by Philip L. Bowers and Kenneth Stephenson defines a conformal pentagonal tiling. This is a tiling of the plane with remarkable combinatorial and geometric properties.However, it doesn’t have finite local complexity in any usual sense, and therefore we cannot study it with the usual tiling theory. The appeal of the tiling is that all the tiles are conformally regular pentagons. But conformal maps are not allowable under finite local complexity. On the other hand, the tiling can be described completely by its combinatorial data, which rather automatically has finite local complexity. In this thesis we give a construction of the continuous and discrete hull just from the combinatorial data.For the discrete hull we construct a C-algebra and a measure. Since this tiling possesses no natural R2 action by translation, there is no a priori reason to expect that the K-theory of the C-algebra of the tiling is the same as the K-theory or cohomology of the hull. So it would be very interesting to know the outcome. For the continuous hull, we compute its K-theory and an absolute continuous invariant measure

AB - The article ”A regular pentagonal tiling of the plane” by Philip L. Bowers and Kenneth Stephenson defines a conformal pentagonal tiling. This is a tiling of the plane with remarkable combinatorial and geometric properties.However, it doesn’t have finite local complexity in any usual sense, and therefore we cannot study it with the usual tiling theory. The appeal of the tiling is that all the tiles are conformally regular pentagons. But conformal maps are not allowable under finite local complexity. On the other hand, the tiling can be described completely by its combinatorial data, which rather automatically has finite local complexity. In this thesis we give a construction of the continuous and discrete hull just from the combinatorial data.For the discrete hull we construct a C-algebra and a measure. Since this tiling possesses no natural R2 action by translation, there is no a priori reason to expect that the K-theory of the C-algebra of the tiling is the same as the K-theory or cohomology of the hull. So it would be very interesting to know the outcome. For the continuous hull, we compute its K-theory and an absolute continuous invariant measure

UR - https://soeg.kb.dk/permalink/45KBDK_KGL/fbp0ps/alma99122889439905763

M3 - Ph.D. thesis

SN - 978-87-7078-994-3

BT - Non-Commutative Geometrical Aspects and Topological Invariants of a Conformally Regular Pentagonal Tiling of the Plane

PB - Department of Mathematical Sciences, Faculty of Science, University of Copenhagen

ER -

ID: 97024048