Beltrami interpretation

A realization of a part of the Lobachevskii plane on a pseudo-sphere — a surface of constant negative curvature. In the Beltrami interpretation, the geodesic lines (cf. Geodesic line) and their segments on the pseudo-sphere play the role of straight lines and their segments on the Lobachevskii plane. The isometric mappings of the pseudo-sphere onto itself represent the movements in the Lobachevskii plane, with preservation of horocircles. The lengths, angles and areas on the pseudo-sphere correspond to the lengths, angles and areas on the Lobachevskii plane. Under these conditions, to each theorem of Lobachevskii planimetry which refers to a part of the Lobachevskii plane there corresponds an analogous theorem of the intrinsic geometry of the pseudo-sphere. The Beltrami interpretation realizes a part of the Lobachevskii plane, but the entire Lobachevskii plane cannot be realized in three-dimensional Euclidean space as a regular surface (Hilbert's theorem).

The Beltrami interpretation was proposed by E. Beltrami in 1868 [1]. This publication represented the first realization of Lobachevskii's "imaginary geometry" in three-dimensional Euclidean space.

For other interpretations of the Lobachevskii geometry see Klein interpretation; Poincaré model.

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