Geodesic mappings of spaces with affine connnection onto generalized Ricci symmetric spaces

Josef Mikes, Volodymyr Evgenyevich Berezovski, Lenka Ryparova


The presented work is devoted to study of the geodesic mappings of spaces with affine connection onto generalized Ricci symmetric spaces. We obtained a fundamental system for this problem in a form of a system of Cauchy type equations in covariant derivatives depending on no more than $1/2
n^2(n + 1) + n$ real parameters. Analogous results are obtained for geodesic mappings of manifolds with affine connection onto equiaffine generalized Ricci symmetric spaces.


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