Numerical simulations in 4+1 dimensions show near-extremal Schwarzschild-de Sitter black holes forming from gravitational wave collapse with mass over 99% of the extremal limit, suggesting the third law may not apply in cosmological settings.
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Proves that a class of quasi-Einstein structures on closed manifolds admit a Killing vector field, extending prior rigidity results and completing classification for compact 2-manifolds while providing new examples.
Constructs all axi-symmetric non-gradient m-quasi-Einstein structures on S^2, including new hypergeometric metrics for m≠2 and a uniqueness theorem showing only the flat torus for m=-1 with zero cosmological constant.
citing papers explorer
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Near--extremal gravitational collapse in 4+1 dimensions: Schwarzschild--de--Sitter space
Numerical simulations in 4+1 dimensions show near-extremal Schwarzschild-de Sitter black holes forming from gravitational wave collapse with mass over 99% of the extremal limit, suggesting the third law may not apply in cosmological settings.
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Quasi-Einstein structures and Hitchin's equations
Proves that a class of quasi-Einstein structures on closed manifolds admit a Killing vector field, extending prior rigidity results and completing classification for compact 2-manifolds while providing new examples.
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New quasi-Einstein metrics on a two-sphere
Constructs all axi-symmetric non-gradient m-quasi-Einstein structures on S^2, including new hypergeometric metrics for m≠2 and a uniqueness theorem showing only the flat torus for m=-1 with zero cosmological constant.