Liberman's lemma is a theorem used in studying intrinsic geometry of convex surface .
It is named after Joseph Liberman .
Formulation
If
γ
{\displaystyle \gamma }
geodesic on the surface of a convex body K in Euclidean space then for any point p ∈ K , the function
t
↦
dist
2
∘
γ
(
t
)
−
t
2
{\displaystyle t\mapsto \operatorname {dist} ^{2}\circ \gamma (t)-t^{2}}
is concave.
References
Либерман, И. М. «Геодезические линии на выпуклых поверхностях». ДАН СССР. 32.2. (1941), 310—313.
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