Gauss-Bonnet for Form Curvatures
classification
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curvaturesgauss-bonnetk-dimensionalallowcomplexcontinuouscovercurvature
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We look at curvatures that are supported on k-dimensional parts of a simplicial complex G. These curvature all satisfy the Gauss-Bonnet theorem, provided that the k-dimensional simplices cover $G$. Each of these curvatures can be written as an expectation of Poincare-Hopf indices. Linear or non-linear wave dynamics with discrete or continuous time allow to deform these curvatures while keeping the Gauss-Bonnet property.
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Remarks about the Moebius-Kantor graph
The Moebius-Kantor graph MK is a Cayley graph for three non-abelian groups and admits a metric preserved uniquely by the Pauli group structure.
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