Novel Tools to Determine Hyperbolic Triangle Centers

Recently discovered tools to study analytic hyperbolic geometry in terms of analogies with analytic Euclidean geometry are presented and employed. Special attention is paid to the study of two novel hyperbolic triangle centers that we call hyperbolic Cabrera points of a hyperbolic triangle and to the way they descend to their novel Euclidean counterparts. The two novel hyperbolic Cabrera points are the (1) Cabrera gyrotriangle ingyrocircle gyropoint and the (2) Cabrera gyrotriangle exgyrocircle gyropoint. Accordingly, their Euclidean counterparts to which they descend are the two novel Euclidean Cabrera points, which are the (1) Cabrera triangle incircle point and the (2) Cabrera triangle excircle point.

[1]  Dana K. Urribarri,et al.  Gyrolayout: A Hyperbolic Level-of-Detail Tree Layout , 2013, J. Univers. Comput. Sci..

[2]  A. Ungar Beyond the Einstein Addition Law and its Gyroscopic Thomas Precession: The Theory of Gyrogroups and Gyrovector Spaces , 2001 .

[3]  A. Ungar The hyperbolic square and Möbius transformations. , 2007 .

[4]  The theorems of Stewart and Steiner in the Poincare disc model of hyperbolic geometry , 2009 .

[5]  M. Brereton Classical Electrodynamics (2nd edn) , 1976 .

[6]  T. Suksumran,et al.  LAGRANGE'S THEOREM FOR GYROGROUP AND THE CAUCHY PROPERTY , 2014, 1408.5050.

[7]  James W. Anderson,et al.  Hyperbolic geometry , 1999 .

[8]  John Stachel,et al.  Einstein's Miraculous Year: Five Papers That Changed the Face of Physics , 1998 .

[9]  Tomás Feder Strong near subgroups and left gyrogroups , 2003 .

[10]  David Wright,et al.  Indra's Pearls: The Vision of Felix Klein , 2002 .

[11]  T. Suksumran,et al.  ISOMORPHISM THEOREMS FOR GYROGROUPS AND L-SUBGYROGROUPS , 2014, 1406.0300.

[12]  C. Barbu Van Aubel's Theorem in the Einstein Relativistic Velocity Model of Hyperbolic Geometry , 2012 .

[13]  C. Fuchs,et al.  Quantum probabilities as Bayesian probabilities , 2001, quant-ph/0106133.

[14]  A. Yadav,et al.  Topological Right Gyrogroups and Gyrotransversals , 2013 .

[15]  C. Kimberling Triangle centers and central triangles , 2001 .

[16]  Paul Yiu,et al.  The uses of homogeneous barycentric coordinates in plane Euclidean geometry , 2000 .

[17]  GYROMETRIC PRESERVING MAPS ON EINSTEIN GYROGROUPS, MOBIUS GYROGROUPS AND PROPER VELOCITY GYROGROUPS , 2014 .

[18]  A. Ungar,et al.  Thomas rotation and the parametrization of the Lorentz transformation group , 1988 .

[19]  A. Ungar Hyperbolic trigonometry in the Einstein relativistic velocity model of hyperbolic geometry , 2000 .

[20]  R. Cahill Novel Gravity Probe B Frame-Dragging Effect , 2004, physics/0406121.

[21]  Milton Ferreira,et al.  Factorizations of Möbius Gyrogroups , 2009 .

[22]  Smarandache's Pedal Polygon Theorem in the Poincare Disc Model of Hyperbolic Geometry , 2010 .

[23]  Menelaus's theorem for hyperbolic quadrilaterals in the Einstein relativistic velocity model of hyperbolic geometry , 2010 .

[24]  THE HYPERBOLIC MENELAUS THEOREM IN THE POINCARE´ DISC MODEL OF HYPERBOLIC GEOMETRY , 2013 .

[25]  A. Ungar,et al.  The Einstein Relativistic Velocity Model of Hyperbolic Geometry and Its Plane Separation Axiom , 2013 .

[26]  A. Ungar Analytic Hyperbolic Geometry in N Dimensions: An Introduction , 2014 .

[27]  T. Suksumran The Algebra of Gyrogroups: Cayley’s Theorem, Lagrange’s Theorem, and Isomorphism Theorems , 2016 .

[28]  Franciscus Sommen,et al.  Complex Boosts: A Hermitian Clifford Algebra Approach , 2013 .

[29]  A. Ungar Gyrations: The Missing Link Between Classical Mechanics with Its Underlying Euclidean Geometry and Relativistic Mechanics with Its Underlying Hyperbolic Geometry , 2013, 1302.5678.

[30]  Trigonometric Proof of Steiner-Lehmus Theorem in Hyperbolic Geometry , 2008 .

[31]  Abraham Albert Ungar,et al.  A Gyrovector Space Approach to Hyperbolic Geometry , 2009, A Gyrovector Space Approach to Hyperbolic Geometry.

[32]  A. Ungar,et al.  Analytic Hyperbolic Geometry: Mathematical Foundations And Applications , 2005 .

[33]  J. Sándor,et al.  On Trigonometrical Proofs of the Steiner-Lehmus Theorem , 2009 .

[34]  On the Origin of the Dark Matter/Energy in the Universe and the Pioneer Anomaly , 2008 .

[35]  C. Moller,et al.  The Theory of Relativity , 1953, The Mathematical Gazette.

[36]  QUASIDIRECT PRODUCT GROUPS AND THE LORENTZ TRANSFORMATION GROUP , 1991 .

[37]  A. Ungar Barycentric calculus in euclidean and hyperbolic geometry: a comparative introduction , 2010 .

[38]  Harmonic Analysis on the Einstein Gyrogroup , 2014 .

[39]  M. Ferreira Gyrogroups in Projective Hyperbolic Clifford Analysis , 2011 .

[40]  When Relativistic Mass Meets Hyperbolic Geometry , 2011 .

[41]  A. Ungar On the Study of Hyperbolic Triangles and Circles by Hyperbolic Barycentric Coordinates in Relativistic Hyperbolic Geometry , 2013, 1305.4990.

[42]  A. Ungar Hyperbolic Triangle Centers: The Special Relativistic Approach , 2010 .

[43]  A. Ungar Analytic Hyperbolic Geometry and Albert Einstein's Special Theory of Relativity , 2008 .

[44]  R. Feynman,et al.  The Feynman Lectures on Physics Addison-Wesley Reading , 1963 .

[45]  M. Ferreira,et al.  Möbius gyrogroups: A Clifford algebra approach , 2011 .

[47]  K. Życzkowski,et al.  Geometry of Quantum States , 2007 .

[48]  Michael G. Crowe,et al.  A History of Vector Analysis , 1969 .