This book introduces for the first time the hyperbolic simplex as an important concept in n-dimensional hyperbolic geometry. The extension of common Euclidean geometry to N dimensions, with N being any positive integer, results in greater generality and succinctness in related expressions. Using new mathematical tools, the book demonstrates that this is also the case with analytic hyperbolic geometry. For example, the author analytically determines the hyperbolic circumcenter and circumradius of any hyperbolic simplex.
This book introduces for the first time the hyperbolic simplex as an important concept in n-dimensional hyperbolic geometry. The extension of common Euclidean geometry to N dimensions, with N being any positive integer, results in greater generality and succinctness in related expressions. Using new mathematical tools, the book demonstrates that this is also the case with analytic hyperbolic geometry. For example, the author analytically determines the hyperbolic circumcenter and circumradius of any hyperbolic simplex.
List of Figures. Preface. Author's Biography. Introduction. Einstein Gyrogroups and Gyrovector Spaces. Einstein Gyrogroups. Problems. Einstein Gyrovector Spaces. Problems. Relativistic Mass Meets Hyperbolic Geometry. Problems. Mathematical Tools for Hyperbolic Geometry. Barycentric and Gyrobarycentric Coordinates. Problems. Gyroparallelograms and Gyroparallelotopes. Problems. Gyrotrigonometry. Problems. Hyperbolic Triangles and Circles. Gyrotriangles and Gyrocircles. Problems. Gyrocircle Theorems. Problems. Hyperbolic Simplices, Hyperplanes and Hyperspheres in N Dimensions. Gyrosimplices. Problems. Gyrosimplex Gyrovolume. Problems. Hyperbolic Ellipses and Hyperbolas. Gyroellipses and Gyrohyperbolas. Problems. VI Thomas Precession. Thomas Precession. Problems. Bibliography. Index.
List of Figures. Preface. Author's Biography. Introduction. Einstein Gyrogroups and Gyrovector Spaces. Einstein Gyrogroups. Problems. Einstein Gyrovector Spaces. Problems. Relativistic Mass Meets Hyperbolic Geometry. Problems. Mathematical Tools for Hyperbolic Geometry. Barycentric and Gyrobarycentric Coordinates. Problems. Gyroparallelograms and Gyroparallelotopes. Problems. Gyrotrigonometry. Problems. Hyperbolic Triangles and Circles. Gyrotriangles and Gyrocircles. Problems. Gyrocircle Theorems. Problems. Hyperbolic Simplices, Hyperplanes and Hyperspheres in N Dimensions. Gyrosimplices. Problems. Gyrosimplex Gyrovolume. Problems. Hyperbolic Ellipses and Hyperbolas. Gyroellipses and Gyrohyperbolas. Problems. VI Thomas Precession. Thomas Precession. Problems. Bibliography. Index.
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