Beltrami's theorem
In mathematics — specifically, in Riemannian geometry — Beltrami's theorem is a result named after the Italian mathematician Eugenio Beltrami which states that geodesic maps preserve the property of having constant curvature. More precisely, if (M, g) and (N, h) are two Riemannian manifolds and φ : M → N is a geodesic map between them, and if either of the manifolds (M, g) or (N, h) has constant curvature, then so does the other one.
Beltrami's theorem
In mathematics — specifically, in Riemannian geometry — Beltrami's theorem is a result named after the Italian mathematician Eugenio Beltrami which states that geodesic maps preserve the property of having constant curvature. More precisely, if (M, g) and (N, h) are two Riemannian manifolds and φ : M → N is a geodesic map between them, and if either of the manifolds (M, g) or (N, h) has constant curvature, then so does the other one.
has abstract
In de Riemann-meetkunde, een d ...... n constante kromming behouden.
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In mathematics — specifically, ...... e, then so does the other one.
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Wikipage page ID
13,636,654
Wikipage revision ID
659,244,372
title
Beltrami's theorem
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BeltramisTheorem
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comment
In de Riemann-meetkunde, een d ...... n constante kromming behouden.
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In mathematics — specifically, ...... e, then so does the other one.
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label
Beltrami's theorem
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Stelling van Beltrami
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