A covariant signature change from Euclidean to Lorentzian geometry on a curvature-regular hypersurface generates inflation via an effective geometric stress tensor, with duration set by the interpolator slope relative to extrinsic and spatial curvatures.
Action and Observer dependence in Euclidean quantum gravity
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abstract
Given a Lorentzian spacetime $(M, g)$ and a non-vanishing timelike vector field $u(\lambda)$ with level surfaces $\Sigma$, one can construct on $M$ a Euclidean metric $g_E^{ab} = g^{ab} + 2 u^a u^b$. Motivated by this, we consider a class of metrics $\hat{g}^{ab} = g^{ab} - \Theta(\lambda)\, u^a u^b$ with an arbitrary function $\Theta$ that interpolates between the Euclidean ($\Theta=-2$) and Lorentzian ($\Theta=0$) regimes. The Euclidean regime is in general different from that obtained from Wick rotation $t \rightarrow - i t$. For example, if $g_{ab}$ is the $k=0$ Lorentzian de Sitter metric corresponding to $\Lambda>0$, the Euclidean regime of $\hat{g}_{ab}$ is the $k=0$ Euclidean anti-de Sitter space with $\Lambda<0$. We analyze the curvature tensors associated with $\hat{g}$ for arbitrary Lorentzian metrics $g$ and timelike geodesic fields $u^a$, and show that they have interesting and remarkable mathematical structures: (i) Additional terms arise in the Euclidean regime $\Theta \to -2$ of $\hat{g}_{ab}$. (ii) For the simplest choice of a step profile for $\Theta$, the Ricci scalar Ric$[\widehat{g}]$ of $\hat{g}_{ab}$ reduces, in the Lorentzian regime $\Theta \to 0$, to the complete Einstein-Hilbert lagrangian with the correct Gibbons-Hawking-York boundary term; the latter arises as a delta-function of strength $2K$ supported on $\Sigma_0$. (iii) In the Euclidean regime $\Theta \to -2$, Ric$[\hat{g}]$ also has an extra term $2\, {}^3 R$ of the $u$-foliation. We highlight similar foliation dependent terms in the full Riemann tensor. We present some explicit examples and briefly discuss implications of the results for Euclidean quantum gravity and quantum cosmology.
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gr-qc 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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Inflation from Covariant Signature Change: A Geometric Mechanism
A covariant signature change from Euclidean to Lorentzian geometry on a curvature-regular hypersurface generates inflation via an effective geometric stress tensor, with duration set by the interpolator slope relative to extrinsic and spatial curvatures.