Abstract
We consider a four-dimensional Riemannian manifold M with an additional structure S, whose fourth power is minus identity. In a local coordinate system the components of the metric g and the structure S form skew-circulant matrices. Both structures S and g are compatible, such that an isometry is induced in every tangent space of M. By a special identity for the curvature tensor, generated by the Riemannian connection of g, we determine classes of Einstein and almost Einstein manifolds. For such manifolds we obtain propositions for the sectional curvatures of some characteristic 2-planes in a tangent space of M. We consider a Hermitian manifold associated with the studied manifold and find conditions for g, under which it is a Kähler manifold. We construct some examples of the considered manifolds on Lie groups.
Highlights
The right circulant matrices and the right skew-circulant matrices are Toeplitz matrices, which15 are thoroughly studied in [1] and [3]
We construct some examples of the 10 considered manifolds on Lie groups
Let M be a 4-dimensional Riemannian manifold equipped with a tensor structure S in every tangent space Tp M at a point p on M
Summary
The right circulant matrices and the right skew-circulant matrices are Toeplitz matrices, which15 are thoroughly studied in [1] and [3]. Let M be a 4-dimensional Riemannian manifold equipped with a tensor structure S in every tangent space Tp M at a point p on M. Let a vector x induce a S-basis and let φ be the angle between x and Sx. The following inequalities are valid: π 4
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