Penrose tiling

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1 Penrose Tiling At the end of a 1975 Scientific American column on tiling the plane periodically with congruent convex polygons (reprinted in my Time Travel and Other Mathematical Bewilderments) I promised a later colum

Penrose Tiling At the end of a 1975 Scientific American column on tiling the plane periodically with congruent convex polygons (reprinted in my Time Travel and Other Mathematical Bewilderments) I promised a later colum

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Source URL: www.maa.org

- Date: 2013-07-12 12:54:37
    2Di¤usive limits on the Penrose tiling A. Telcs October 21, 2009 Abstract In this paper random walks on the Penrose tiling and on its local perturbation are investigated. Heat kernel estimates and the invariance principl

    Di¤usive limits on the Penrose tiling A. Telcs October 21, 2009 Abstract In this paper random walks on the Penrose tiling and on its local perturbation are investigated. Heat kernel estimates and the invariance principl

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    Source URL: www.cs.bme.hu

    - Date: 2009-10-21 07:27:46
      3Wang Tiles May 2, 2006 Abstract Suppose we want to cover the plane with decorated square tiles of the same size. Tiles are to be chosen from a finite number of types. There are unbounded tiles of each type available. Due

      Wang Tiles May 2, 2006 Abstract Suppose we want to cover the plane with decorated square tiles of the same size. Tiles are to be chosen from a finite number of types. There are unbounded tiles of each type available. Due

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      Source URL: www.staff.science.uu.nl

      Language: English - Date: 2011-12-30 16:37:17
      4Manual for the Tiling Database Brian Wichmann and Tony Lee December 3, 2015 Contents 1 Introduction

      Manual for the Tiling Database Brian Wichmann and Tony Lee December 3, 2015 Contents 1 Introduction

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      Source URL: www.tilingsearch.org

      Language: English - Date: 2015-12-12 14:44:24
      5How to make tilings This instruction shows how to make tilings from a triangle shaped base. Equilateral triangles can be used to cover an area without wholes and without overlapping. This is because their angles are 60°

      How to make tilings This instruction shows how to make tilings from a triangle shaped base. Equilateral triangles can be used to cover an area without wholes and without overlapping. This is because their angles are 60°

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      Source URL: www.mathematicsinthemaking.eu

      Language: English - Date: 2014-12-12 11:21:18
      6The Conquest of Space through Color and Bodies of Color Dominique von Burg Hanna Roeckle commutes between painting, sculpture, and installation when, for example, she makes wooden panels of a depth that lends them the ch

      The Conquest of Space through Color and Bodies of Color Dominique von Burg Hanna Roeckle commutes between painting, sculpture, and installation when, for example, she makes wooden panels of a depth that lends them the ch

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      Source URL: www.hannaroeckle.com

      Language: English - Date: 2015-06-20 12:38:49
      7Schweizerische Gesellschaft für Kristallographie Société Suisse de Cristallographie Sektion für Kristallwachstum und Kristalltechnologie Section de Croissance et Technologie des Cristaux SGK/SSCr NEWSLETTER

      Schweizerische Gesellschaft für Kristallographie Société Suisse de Cristallographie Sektion für Kristallwachstum und Kristalltechnologie Section de Croissance et Technologie des Cristaux SGK/SSCr NEWSLETTER

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      Source URL: cms.unige.ch

      Language: English - Date: 2012-06-17 17:58:00
      8MY FAVORITE NUMBERS: John Baez September 15, 2008 The Rankin Lectures Supported by the Glasgow Mathematical Journal Trust

      MY FAVORITE NUMBERS: John Baez September 15, 2008 The Rankin Lectures Supported by the Glasgow Mathematical Journal Trust

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      Source URL: math.ucr.edu

      Language: English - Date: 2015-04-01 22:17:41
      9The Rankin LecturesDifferent numbers have different personalities. The number 5 is quirky and intriguing, thanks in large part to its relation with the golden ratio, the ‘most irrational’ of irrational numbers

      The Rankin LecturesDifferent numbers have different personalities. The number 5 is quirky and intriguing, thanks in large part to its relation with the golden ratio, the ‘most irrational’ of irrational numbers

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      Source URL: math.ucr.edu

      Language: English - Date: 2008-09-10 19:16:06
      10Discrete Comput Geom OF1–OF14DOI: s00454Discrete & Computational Geometry

      Discrete Comput Geom OF1–OF14DOI: s00454Discrete & Computational Geometry

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      Source URL: www.mathematicians.org.uk

      Language: English - Date: 2005-10-23 19:00:00