The geometric sense of R. Sasaki connection
Abstract
For the Riemannian manifold Mn two special connections on the sum of the tangent bundle TMn and the trivial one-dimensional bundle are constructed. These connections are flat if and only if the space Mn has a constant sectional curvature 1. The geometric explanation of this property is given. This construction gives a coordinate free many-dimensional generalization of the connection from the paper: R. Sasaki 1979 Soliton equations and pseudospherical surfaces, Nuclear Phys., 154 B, pp. 343-357. It is shown that these connections are in close relation with the imbedding of Mn into Euclidean or pseudoeuclidean (n+1)-dimension spaces.
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