Some rigidity characterizations on critical metrics for quadratic curvature functionals

We prove the existence of four-dimensional compact manifolds admitting some non-Einstein Lorentzian metrics, which are critical points for all quadratic curvature functionals. For this purpose, we consider left-invariant semi-direct extensions $$G_{\mathcal S}=H \rtimes \exp ({\mathbb {R}}S)$$ G S = H ⋊ exp ( R S ) of the Heisenberg Lie group H, for any $$\mathcal S \in {\mathfrak {s}}{\mathfrak {p}}(1,\mathbb R)$$ S ∈ s p ( 1 , R ) , equipped with a family $$g_a$$ g a of left-invariant metrics. After showing the existence of lattices in all these four-dimensional solvable Lie groups, we completely determine when $$g_a$$ g a is a critical point for some quadratic curvature functionals. In particular, some four-dimensional solvmanifolds raising from these solvable Lie groups admit non-Einstein Lorentzian metrics, which are critical for all quadratic curvature functionals.

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Some rigidity characterizations on critical metrics for quadratic curvature functionals

Cited by 3 publications

References 19 publications

A note on rigidity of Riemannian manifolds with positive scalar curvature

A note on rigidity of Riemannian manifolds with positive scalar curvature

Variational formulae of some functionals by the modified Schouten tensor

Critical metrics for quadratic curvature functionals on some solvmanifolds

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