Tiling

Results: 433



#Item
41V.BulatovBending Hyperbolic Kaleidoscopes

V.BulatovBending Hyperbolic Kaleidoscopes

Add to Reading List

Source URL: bulatov.org

Language: English - Date: 2011-08-15 22:43:14
42PIGEON-HOLING MONODROMY GROUPS NILES G. JOHNSON A BSTRACT. A simple tiling on a sphere can be used to construct a tiling on a d-fold branched cover of the sphere. By lifting a so-called equatorial tiling on the sphere, t

PIGEON-HOLING MONODROMY GROUPS NILES G. JOHNSON A BSTRACT. A simple tiling on a sphere can be used to construct a tiling on a d-fold branched cover of the sphere. By lifting a so-called equatorial tiling on the sphere, t

Add to Reading List

Source URL: www.tilings.org

Language: English - Date: 2002-12-15 19:09:51
    43PIGEON-HOLING MONODROMY GROUPS NILES G. JOHNSON A BSTRACT. A simple tiling on a sphere can be used to construct a tiling on a d-fold branched cover of the sphere. By lifting a so-called equatorial tiling on the sphere, t

    PIGEON-HOLING MONODROMY GROUPS NILES G. JOHNSON A BSTRACT. A simple tiling on a sphere can be used to construct a tiling on a d-fold branched cover of the sphere. By lifting a so-called equatorial tiling on the sphere, t

    Add to Reading List

    Source URL: tilings.org

    Language: English - Date: 2002-12-15 19:09:51
      44Rotation and Tiling Groups, Genus 2-13 S. Allen Broughton, Robert M. Dirks∗ , Maria T. Sloughter∗ , C. Ryan Vinroot∗ February 15, 2001 The tables that follow give for each triple of a genus σ a group G and branchi

      Rotation and Tiling Groups, Genus 2-13 S. Allen Broughton, Robert M. Dirks∗ , Maria T. Sloughter∗ , C. Ryan Vinroot∗ February 15, 2001 The tables that follow give for each triple of a genus σ a group G and branchi

      Add to Reading List

      Source URL: www.tilings.org

      Language: English - Date: 2001-02-17 23:19:19
        45Rotation and Tiling Groups, Genus 2-13 S. Allen Broughton, Robert M. Dirks∗ , Maria T. Sloughter∗ , C. Ryan Vinroot∗ February 15, 2001 The tables that follow give for each triple of a genus σ a group G and branchi

        Rotation and Tiling Groups, Genus 2-13 S. Allen Broughton, Robert M. Dirks∗ , Maria T. Sloughter∗ , C. Ryan Vinroot∗ February 15, 2001 The tables that follow give for each triple of a genus σ a group G and branchi

        Add to Reading List

        Source URL: tilings.org

        Language: English - Date: 2001-02-17 23:19:19
          46Introduction Counting Problems Feasibility Problems Tiling Problems Daniel Litt

          Introduction Counting Problems Feasibility Problems Tiling Problems Daniel Litt

          Add to Reading List

          Source URL: math.columbia.edu

          Language: English - Date: 2015-04-14 21:36:19
            47Symmetry and Tiling Groups for Genus 4 and 5 C. Ryan Vinroot∗ Abstract All symmetry groups for surfaces of genus 2 and 3 are known. In this paper, we classify symmetry groups and tiling groups with three branch points

            Symmetry and Tiling Groups for Genus 4 and 5 C. Ryan Vinroot∗ Abstract All symmetry groups for surfaces of genus 2 and 3 are known. In this paper, we classify symmetry groups and tiling groups with three branch points

            Add to Reading List

            Source URL: www.tilings.org

            Language: English - Date: 2001-02-17 23:54:35
              48Oval Intersections in Tilings on Surfaces Dennis A. Schmidt¤ November 26, 1998 Abstract A tiling is a covering by polygons, without gaps or overlapping, of

              Oval Intersections in Tilings on Surfaces Dennis A. Schmidt¤ November 26, 1998 Abstract A tiling is a covering by polygons, without gaps or overlapping, of

              Add to Reading List

              Source URL: tilings.org

              Language: English - Date: 2000-12-27 16:59:08
                49Symmetry and Tiling Groups for Genus 4 and 5 C. Ryan Vinroot∗ Abstract All symmetry groups for surfaces of genus 2 and 3 are known. In this paper, we classify symmetry groups and tiling groups with three branch points

                Symmetry and Tiling Groups for Genus 4 and 5 C. Ryan Vinroot∗ Abstract All symmetry groups for surfaces of genus 2 and 3 are known. In this paper, we classify symmetry groups and tiling groups with three branch points

                Add to Reading List

                Source URL: tilings.org

                Language: English - Date: 2001-02-17 23:54:35
                  50Parametric Tiling with Inter-Tile Data Reuse Alain Darte Alexandre Isoard Compsys, LIP, UMR 5668 CNRS, INRIA, ENS-Lyon, UCB-Lyon

                  Parametric Tiling with Inter-Tile Data Reuse Alain Darte Alexandre Isoard Compsys, LIP, UMR 5668 CNRS, INRIA, ENS-Lyon, UCB-Lyon

                  Add to Reading List

                  Source URL: impact.gforge.inria.fr

                  Language: English - Date: 2013-12-12 17:27:41