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Analytic Hyperbolic Geometry in N Dimensions

Abraham Albert Ungar
€248.00
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advanced mathematical physics
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Analytic Hyperbolic Geometry
Author_Abraham Albert Ungar
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barycentric
Barycentric Coordinates
Barycentric Representation
Category1=Non-Fiction
Category=PBH
Category=PBMS
Category=PHU
Cof M4
Computer Algebra System
Coordinates M1
COP=United States
Cos ?ij
Cos Αij
counterpart
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Det ?3
Det Γ3
einstein
Einstein Addition
Einstein Gyrogroups
Einstein Gyrovector Space
Einstein Gyrovector Spaces
Einstein Velocity Addition
eq_bestseller
eq_isMigrated=2
eq_nobargain
eq_non-fiction
eq_science
equation
euclidean
Euclidean Counterpart
Euclidean Plane R2
factors
Fi Rst Equation
Fi Rst Identity
gamma
Gamma Factors
Gamma Identity
Gamma Matrix
geometric transformations
Gyration Gyr
Gyrobarycentric Coordinates
gyrocircle
Gyrocircle Theorems
Gyroellipses
Gyrohyperbolas
Gyroparallelograms
Gyroparallelotopes
Gyrotriangles
Gyrotrigonometry
gyrovector
Gyrovector Spaces
Hyperbolic Counterpart
Hyperbolic Geometry
hyperbolic simplex applications in science
Independent Set
Language_English
n-dimensional geometry
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PS=Active
relativistic algebraic structures
rst
Sin ?14
Sin ?2 Sin
Sin Α14
Sin Δ2 Sin
Sin2 ?1 Sin
Sin2 Α1 Sin
softlaunch
spaces
special relativity mathematics
theoretical physics research
Thomas Precession

Product details

  • ISBN 9781482236675
  • Weight: 1000g
  • Dimensions: 156 x 234mm
  • Publication Date: 17 Dec 2014
  • Publisher: Taylor & Francis Inc
  • Publication City/Country: US
  • Product Form: Hardback
  • Language: English
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Description

The concept of the Euclidean simplex is important in the study of n-dimensional Euclidean geometry. This book introduces for the first time the concept of hyperbolic simplex as an important concept in n-dimensional hyperbolic geometry.

Following the emergence of his gyroalgebra in 1988, the author crafted gyrolanguage, the algebraic language that sheds natural light on hyperbolic geometry and special relativity. Several authors have successfully employed the author’s gyroalgebra in their exploration for novel results. Françoise Chatelin noted in her book, and elsewhere, that the computation language of Einstein described in this book plays a universal computational role, which extends far beyond the domain of special relativity.

This book will encourage researchers to use the author’s novel techniques to formulate their own results. The book provides new mathematical tools, such as hyperbolic simplexes, for the study of hyperbolic geometry in n dimensions. It also presents a new look at Einstein’s special relativity theory.

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