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(Varying c), cosmological fluctuations and the quest for quantum gravity. Jo ã o Magueijo 2016 Imperial College, London. “ Look what happens to people when they get married ” (Niels Bohr). c(x,t). c(E). Varying c theories. Covariant and Lorentz invariant [Moffat,Magueijo, etc, etc]
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(Varying c), cosmological fluctuations and the quest for quantum gravity João Magueijo 2016 Imperial College, London
“Look what happens to people when they get married” (Niels Bohr)
c(x,t) c(E) Varying c theories • Covariant and Lorentz invariant [Moffat,Magueijo, etc, etc] • Bimetric theories [Moffat, Clayton, Drummond, etc, etc] • Preferred frame [Albrecht, Magueijo,Barrow,etc,etc] • Deformed dispersion relations (DDRs) [Amelino-Camelia, Mavromatos, Magueijo & Smolin, etc, etc]
The zero-th order “holy grail” of cosmology: • Near scale-invariance • Amplitude
The higher order “holy grail” • Very specific departures from scale invariance: • 3-point function (non-Gaussianities) • Gravity waves (tensor modes)
A critique of “evidence for inflation” • Bayesian evidence is a tool for playing the lottery or investing in the stock market: hedging the bets works! • It favors non-predictive theories, because you get a power-law fine for spreading your bets, but an exponential one for making a prediction and missing the data.
Science is about falsifiability • A theory should not only have large evidence, but its evidence should be exceptional, given what it would have been had the data been different. • See arXiv:1506.09143.
The connection with quantum gravity • Deformed dispersion relations (DDRs) are already a central tool in quantum gravity phenomenology. • They may be used to explain the CMB fluctuations directly. • There is a connection with the mounting evidence for a 2D UV fixed point.
The Big Bang horizon problem: Dominates at late times If If (with )
How inflation solves the problem: Dominates earlier Dominates later With
How theories with a varying c solve the problem: Dominates earlier Dominates later With but with we still get:
c(x,t) c(E) Varying c theories • Covariant and Lorentz invariant [Moffat,Magueijo, etc, etc] • Bimetric theories [Moffat, Clayton, Drummond, etc, etc] • Preferred frame [Albrecht, Magueijo,Barrow,etc,etc] • Deformed dispersion relations (DDRs) [Amelino-Camelia, Mavromatos, Magueijo & Smolin, etc, etc]
Bimetric theories A metric for gravity (Einstein frame): A metric for matter (matter frame):
This is a rather conservative thing to do… If the two metrics are conformal, we have a varying-G (Brans-Dicke) theory If they are disformal we have a VSL theory The speed of light differs from the speed of gravity (larger if B>0, with )
The minimal bimetric VSL theory C A subtlety with the variational calculus problem: The KG Lagrangian in the matter frame does NOT give the KG equation.
Something truly cool… C Gives a Klein-Gordon equation in matter frame
A cosmological constant in the matter frame leads to the (anti)DBI action C Specifically need a positive Lambda in the Einstein frame balanced by a negative lambda in the matter frame, to get the right low-energy limit: with f = –B < 0.
What sort of fluctuations come out of these theories? • If we project onto the Einstein frame, we end up with the same formalism usually used for inflation, but… • including a varying speed of sound. • This is the so-called K-inflation (an inflaton with non-quadratic kinetic terms).
Using the K-essence toolbox C Constant w solutions for mass potentials
A remarkable result: For ALL equations of state This scaling law seems to be the equivalent of de Sitter space in bimetric models
Even more remarkable! • This law can be realized by an anti-DBI model in the Einstein frame (DBI with wrong sign of the coupling), which… • turns out to be the minimal dynamics associated with a bimetric VSL (Klein-Gordon equations in matter frame, constant B in relation between metrics)
An alternative derivation This can be understood from the following recasting of the final result:
Where does the amplitude come from? Obviously the variations in c must be cut off at low energies: The cut-off scale fixes the amplitude:
Do we go above Planck? Yes, we do. We have a direct trans-Planckian problem and we embrace it. Inflation, instead, was designed to insulate the observable Universe from quantum gravity.
Beyond the “zeroth order” holy grail • If the relation between the two metrics is then we obtain a tilted spectrum
Is this then another “theory of anything”? No! C • No gravity waves… • but a possibility for a “consistency relation” is to look into the bispectrum (3-point function):
A consistency relation between shape of the 3-point function and n_s C
What about thermal fluctuations? (see Afshordi and Magueijo, 1603.03312) • Implicit in all previous “power spectra” is the multiplicative factor: • But what if the state is a thermal state?
This changes the spectral index • In all regimes of interest • Therefore vacuum quantum fluctuations and thermal fluctuations have spectra related by: • (i.e. we get white noise where usually scale-invariance in found)
What speed of sound profile would lead to thermal scale-invariance? • For ALL equations of state we find that we need a very fast phase transition in • Amplitude of the fluctuation is now fixed by the temperature at which the phase transition occurs:
Exact scale-invariance is unreachable, because the limit is discontinuous
The critical model has a running spectrum: And contains a unique prediction of n_s from the amplitude
Also there is a string theory interpretation: This solution has a simple geometrical interpretation based on the action of a probe 3-brane embedded in an EAdS2 X E_3 geometry.
c(x,t) c(E) Varying c theories • Covariant and Lorentz invariant [Moffat,Magueijo, etc, etc] • Bimetric theories [Moffat, Clayton, Drummond, etc, etc] • Preferred frame [Albrecht, Magueijo,Barrow,etc,etc] • Deformed dispersion relations (DDRs) [Amelino-Camelia, Mavromatos, Magueijo & Smolin, etc, etc]
Conclusion: this dispersion relation is very interesting indeed! • This is the DDR equivalent of deSitter spacetime for inflation • [Or of for bimetric models.]
BUT there are some further interesting robust connections: • The dimensional reduction inference is made via UV spectral dimension of “spacetime” as computed with deformed dispersion relations • This is the same as the Hausdorff dimension of momentum space in units in which the DDRs are trivialized.
Specifically: • We can always find “linearizing units” which trivialize DDRs. In our case: • This “dual picture” shifts the non-trivial effects elsewhere, e.g. the measure:
In the dual picture the gravity is no longer Einstein! • The metric becomes “rainbow”, i.e. k-dependent. • Gravity switches off (or rather, everything is conformally coupled) just as for radiation under Einstein gravity: • What does this mean for QG?................
Beyond this calculation, the following concepts seem closely related: • Dimensional reduction to 2 dimensions in the UV • Scale-invariance of vacuum quantum fluctuations. • Gravity switching off; or everything coupling conformally to gravity (so that there is no inside/outside horizon).
What about “the devil in the detail”? Six sigma evidence that the spectrum is red. Tensor modes… Non-Gaussianities…
Gravitational waves/ tensor modes • In general they could have different DDRs to scalar modes. For example: • (and even if gamma is the same, b could be different from 1). • The UV ratio of the speed of light and the speed of gravity
The amplitude of the spectrum depends on this: • If you work out all the factors the result is:
Not very predictive at this stage, but… • It plugs CMB observables directly into quantum gravity phenomenology (instead of insulating one from the other). • More than“consistency relations” in principle n_S and r could be fully fixed by QG!
