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Metric Methods of Finsler Spaces and in the Foundations of Geometry
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Herbert Busemann
Language:
English
Published/Copyright:
1943
About this book
A classic treatment of metric methods of Finsler spaces from the acclaimed Annals of Mathematics Studies series
Princeton University Press is proud to have published the Annals of Mathematics Studies since 1940. One of the oldest and most respected series in science publishing, it has included many of the most important and influential mathematical works of the twentieth century. The series continues this tradition as Princeton University Press publishes the major works of the twenty-first century.
To mark the continued success of the series, all books are available in paperback and as ebooks.
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Publishing information
Pages and Images/Illustrations in book
eBook published on:
March 2, 2016
eBook ISBN:
9781400882298
Pages and Images/Illustrations in book
Main content:
243
eBook ISBN:
9781400882298
Keywords for this book
Theorem; Minkowski space; Geometry; Metric space; Riemannian geometry; Intersection (set theory); Convex set; Hilbert geometry; Jordan curve theorem; Sign (mathematics); Linear space (geometry); Hyperbolic geometry; Parity (mathematics); Topological space; Axiom; Dimension (vector space); Elliptic geometry; Convex metric space; Two-dimensional space; Topology; Exterior (topology); Tangent space; Non-Euclidean geometry; Geodesic; Euclidean space; Projective plane; Triangle inequality; Asymptote; Affine transformation; Topological group; Absolute geometry; Differentiable function; Three-dimensional space (mathematics); Homotopy; Dimensional analysis; Euclidean geometry; Convex function; Invariance theorem; Conjugate points; Projective geometry; Euclidean distance; Limit point; Special case; Line at infinity; Hilbert space; Curvature; Cartesian coordinate system; Equation; Linear subspace; Ellipse; Dimension; Simply connected space; Transitive relation; Infimum and supremum; Ellipsoid; Collinearity; Hyperbola; Geodesy; Convex curve; Convex polygon; Covariance and contravariance of vectors; Tangent cone; Axiomatic system; Hyperplane; Subsequence; Perpendicular; Coordinate system; Elementary proof; Linearity; Hyperbolic motion
Audience(s) for this book
College/higher education;Professional and scholarly;
