Contact

Dr. Elke Müller
Dr. Elke Müller
Press Officer AEI Potsdam
Telefon:+49 331 567-7303Fax:+49 331 567-7298

Publication

1.
Alice Di Tucci and Jean-Luc Lehners
The No-Boundary Proposal as a Path Integral with Robin Boundary Conditions

Funded by the European Research Council

This project has received funding from the European Research Council (ERC) under the European Union's Horizon 2020 research and innovation programme grant agreement no. 772295.

European Research Council

This project has received funding from the European Research Council (ERC) under the European Union's Horizon 2020 research and innovation programme grant agreement no. 772295.

Quantum theory and the beginning of the Universe

Rewriting Hartle's and Hawking's no-boundary proposal as a path integral with Robin boundary conditions

24. Mai 2019

Two AEI researchers have looked at how quantum theory relates to the idea that a finite Universe might have appeared out of nothing due to something akin of a quantum tunnelling effect. This idea was described in the “no-boundary proposal” by Hartle and Hawking. The authors show that this no-boundary proposal can be reformulated as describing a universe arising not from the complete absence of space and time, but rather from specific quantum fluctuations of spacetime. This is in agreement with Heisenberg’s uncertainty principle applied to the geometry of the universe.
On the left we have the smooth saddle point geometry of Hartle-Hawking type. By contrast, with Robin boundary conditions a typical off-shell geometry will not start at zero size (middle). Some off-shell geometries contain a recollapse to zero size, and it is these geometries that we would like to avoid summing over (right). Bild vergrößern
On the left we have the smooth saddle point geometry of Hartle-Hawking type. By contrast, with Robin boundary conditions a typical off-shell geometry will not start at zero size (middle). Some off-shell geometries contain a recollapse to zero size, and it is these geometries that we would like to avoid summing over (right). [weniger]

Paper abstract

Realising the no-boundary proposal of Hartle and Hawking as a consistent gravitational path integral has been a long-standing puzzle. In particular, it was demonstrated by Feldbrugge et al.that the sum over all universes starting from zero size results in an unstable saddle point geometry. Here we show that in the context of gravity with a positive cosmological constant, path integrals with a specific family of Robin boundary conditions overcome this problem. These path integrals are manifestly convergent and are approximated by stable Hartle-Hawking saddle point geometries.The price to pay is that the off-shell geometries do not start at zero size. The Robin boundary conditions may be interpreted as an initial state with Euclidean momentum, with the quantum uncertainty shared between initial size and momentum.

 
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