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All metrics have curvature tensors characterised by its invariants as a limit: the ε-property

We prove a generalisation of the $ε$-property, namely that for any dimension and signature, a metric which is not characterised by its polynomial scalar curvature invariants, there is a frame such that the components of the curvature tensors can be arbitrary close to a certain "background". This "background" is defined by its curvature tensors: it is characterised by its curvature tensors and has the same polynomial curvature invariants as the original metric.

preprint2011arXivOpen access
Sigbjorn Hervik
math-phmath.MPgr-qchep-th
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Sigbjorn Hervik

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