On the Mesure of sets of parallel linear subspace in affine space

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On the Mesure of sets of parallel linear subspace in affine space

Santaló, Lluís

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URI: http://hdl.handle.net/10256.2/10122
Date: 1962

Abstract

 
Demostració d'un teorema relacionat amb la mesura dels conjunts del subespai lineal paral·lel a l’espai afí
 
The aim of this paper is to prove the following theorem: “in order that sets of elements H composed by q parallel linear subspaces of dimensions h1, h2… Hq, which transform transitively by the unimodular affine group ʮ have an invariant measure with respect to ʮ, it is necessary and sufficient that the dimensions hi be all equal, ...[+]
The aim of this paper is to prove the following theorem: “in order that sets of elements H composed by q parallel linear subspaces of dimensions h1, h2… Hq, which transform transitively by the unimodular affine group ʮ have an invariant measure with respect to ʮ, it is necessary and sufficient that the dimensions hi be all equal, h1 = h2 = h3 = … = hq = h, and that q = n + 1 – h”[-]
 
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