On singular solutions in multidimensional gravity
Abstract
It is proved that the Riemann tensor squared is divergent as τ 0 for a wide class of cosmological metrics with non-exceptional Kasner-like behaviour of scale factors as τ 0, where τ is synchronous time. Using this result it is shown that any non-trivial generalization of the spherically-symmetric Tangherlini solution to the case of n Ricci-flat internal spaces FIM has a divergent Riemann tensor squared as R R0, where R0 is parameter of length of the solution. Multitemporal naked singularities are also considered.
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