Research Article

Triangles In The De-Sitter Plane

Volume: 40 Number: 2 June 30, 2019
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Triangles In The De-Sitter Plane

Abstract

The triangular varieties in the de-Sitter plane were investigated and the formulas of triangles of non-degenerate    and   type of triangles were obtained in terms of dihedral angles.

Keywords

References

  1. [1] Asmus, I., Duality Between Hyperbolic and de-Sitter Geometry, Cornell University, New York, (2008) 1-32.
  2. [2] O’neil, B., Semi-Riemannian Geometry, AcademicPress., London, (1983) 46-49, 54-57, 108-114, 143-144.
  3. [3] Suarez-Peiro, E., A SchlafliDifferential Formula for Implices in Semi-Riemannian Hyperquadrics, Gauss-Bonnet Formulas fo rSimplices in the de Sitter Sphere and the Dual Volume of a Hyperbolic Simplex, Pasicif Journal of Mathematics, 194(1) (2000) 229.
  4. [4] Karlığa, B., Edgematrix of hyperbolic simplices, Geom. Dedicata, 109 (2004) 1–6.
  5. [5] Karlığa, B., Yakut, A.T., Vertexangles of a simplex in hyperbolic space , Geom. Dedicata, 120 (2006) 49-58.

Details

Primary Language

English

Subjects

-

Journal Section

Research Article

Authors

Publication Date

June 30, 2019

Submission Date

November 26, 2018

Acceptance Date

March 20, 2019

Published in Issue

Year 2019 Volume: 40 Number: 2

DOI

https://doi.org/10.17776/csj.487548

IZ

https://izlik.org/JA56KM37FH

Cite

RIS / Bibtex
APA
Mert, T. (2019). Triangles In The De-Sitter Plane. Cumhuriyet Science Journal, 40(2), 505-517. https://doi.org/10.17776/csj.487548

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