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Equivalence problem for the orthogonal webs on the sphere
release_rev_a75babe5-7b67-4c93-96ff-59ee889ddef0
by
Caroline Cochran,
Raymond G. McLenaghan,
Roman G. Smirnov
Released
as a article
.
2010
Abstract
We solve the equivalence problem for the orthogonally separable webs on the
three-sphere under the action of the isometry group. This continues a classical
project initiated by Olevsky in which he solved the corresponding canonical
forms problem. The solution to the equivalence problem together with the
results by Olevsky forms a complete solution to the problem of orthogonal
separation of variables to the Hamilton-Jacobi equation defined on the
three-sphere via orthogonal separation of variables. It is based on invariant
properties of the characteristic Killing two-tensors in addition to properties
of the corresponding algebraic curvature tensor and the associated Ricci
tensor. The result is illustrated by a non-trivial application to a natural
Hamiltonian defined on the three-sphere.
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arXiv
1009.4244v1
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