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Yokes and tensors derived from yokes

✍ Scribed by P. Blæsild

Publisher
Springer Japan
Year
1991
Tongue
English
Weight
880 KB
Volume
43
Category
Article
ISSN
0020-3157

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✦ Synopsis

A yoke on a differentiable manifold M gives rise to a whole family of derivative strings. Various elemental properties of a yoke are discussed in terms of these strings. In particular, using the concept of intertwining from the theory of derivative strings it is shown that a yoke induces a family of tensors on M. Finally, the expected and observed a-geometries of a statistical model and related tensors are shown to be derivable from particular yokes.

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