Difference between revisions of "Euclidean and Affine Spaces: A Hidden Complementarity"

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[[Category:Scientific Paper|euclidean affine spaces hidden complementarity]]
 
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Latest revision as of 19:31, 1 January 2017

Scientific Paper
Title Euclidean and Affine Spaces: A Hidden Complementarity
Author(s) Michael H Brill
Keywords metrics, line elements, space-time physics, general relativity, invariance, covariance, color science
Published 2009
Journal Physics Essays
Volume 22
Number 3
No. of pages 3
Pages 301-303

Abstract

A structure that can be interpreted as either affine or Euclidean is identified. That structure was invented to describe the manifold of colors, which has an undisputed affine symmetry (based on color matches) but a debated line element (based on color discrimination). The affine/Euclidean structure is reviewed here as a way to tune our notions of "invariance" and "covariance" in space-time physics. In particular, the structure displays a kind of manifest covariance that is rare in space-time physics, despite common invocations of the Principle of General Covariance in that field.