A curvature identity on a~6-dimensional Riemannian manifold and its applications

Abstract: We derive a curvature identity that holds on any 6-dimensional Riemannian manifold, from the Chern-Gauss-Bonnet theorem for a 6-dimensional closed Riemannian manifold. We also introduce some applications of this curvature identity.2000 Mathematics Subject Classification. 53B20, 53C25.

“…In this paper, we provide the explicit formulae of Patterson's curvature identity that holds on 5-dimensional and 6-dimensional Einstein manifolds. We confirm that the curvature identities on the Einstein manifold from the previous work [8] are the same as the curvature identities deduced from Patterson's result. We also provide examples that support the theorems.…”

“…In [8], the authors consider the one-parameter deformation g(t) of g, using the fact that Euler characteristic is a topological invariant for the deformation, they got the universal curvature identity which holds on any 6-dimensional Riemannian manifold. In particular, they have the following.…”

“…We derive the curvature identities from Patterson's curvature identity. In Section 2, we recall the previous results for a 6-dimensional Riemannian manifold [8] and introduce Patterson's curvature identity. In Section 3 and Section 4, we prove Theorem A and Theorem B, respectively.…”

“…

Patterson discussed the curvature identities on Riemannian manifolds in [14], and a curvature identity for any 6-dimensional Riemannian manifold was independently derived from the Chern-Gauss-Bonnet Theorem [8]. In this paper, we provide the explicit formulae of Patterson's curvature identity that holds on 5-dimensional and 6-dimensional Einstein manifolds.

…”

Curvature identities for Einstein manifolds of dimension 5 and 6

“…In this paper, we provide the explicit formulae of Patterson's curvature identity that holds on 5-dimensional and 6-dimensional Einstein manifolds. We confirm that the curvature identities on the Einstein manifold from the previous work [8] are the same as the curvature identities deduced from Patterson's result. We also provide examples that support the theorems.…”

“…In [8], the authors consider the one-parameter deformation g(t) of g, using the fact that Euler characteristic is a topological invariant for the deformation, they got the universal curvature identity which holds on any 6-dimensional Riemannian manifold. In particular, they have the following.…”

“…We derive the curvature identities from Patterson's curvature identity. In Section 2, we recall the previous results for a 6-dimensional Riemannian manifold [8] and introduce Patterson's curvature identity. In Section 3 and Section 4, we prove Theorem A and Theorem B, respectively.…”

“…

Patterson discussed the curvature identities on Riemannian manifolds in [14], and a curvature identity for any 6-dimensional Riemannian manifold was independently derived from the Chern-Gauss-Bonnet Theorem [8]. In this paper, we provide the explicit formulae of Patterson's curvature identity that holds on 5-dimensional and 6-dimensional Einstein manifolds.

…”

Curvature identities for Einstein manifolds of dimension 5 and 6

“…But Damek and Ricci [3] found that there are many counterexamples if dimension n ≥ 7. Euh, Park and Sekigawa [4] provide a new proof of the Lichnerowicz conjecture for dimension n = 4, 5 in a slightly more general setting using universal curvature identities.…”

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