Spherical, hyperbolic, and other projective geometries: convexity, duality, transitions

  • François Fillastre

    Université de Cergy-Pontoise, France
  • Andrea Seppi

    Université du Luxembourg, Esch-sur-Alzette, Luxembourg
Spherical, hyperbolic, and other projective geometries: convexity, duality, transitions cover

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Abstract

We give an elementary projective geometry presentation of the classical Riemannian model spaces (elliptic and hyperbolic spaces) and of the classical Lorentzian model spaces (de Sitter and anti-de Sitter spaces). We also present some relevant degenerate model spaces (Euclidean and co-Euclidean spaces, Lorentzian Minkowski and co-Minkowski spaces), and geometric transitions. An emphasis is given to dimensions 2 and 3, convex subsets, duality, and geometric transitions between the spaces.