nonlinear massive gravity and...
TRANSCRIPT
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Massive gravityand cosmology
Shinji Mukohyama(Kavli IPMU, U of Tokyo)
Based on collaboration with
Antonio DeFelice, Emir Gumrukcuoglu, Kurt
Hinterbichler, Chunshan Lin, Mark Trodden
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Why alternative gravity theories?
http://map.gsfc.nasa.gov/
Dark Energy
Dark Matter
Inflation
Big Bang
“Singularity”
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Three conditions for good
alternative theories of gravity(my personal viewpoint)
1. Theoretically consistent
e.g. no ghost instability
2. Experimentally viable
solar system / table top experiments
3. Predictable
e.g. protected by symmetry
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Some examplesI. Ghost condensation
IR modification of gravitymotivation: dark energy/matter
II. Nonlinear massive gravityIR modification of gravitymotivation: “Can graviton have mass?”
III. Horava-Lifshitz gravityUV modification of gravitymotivation: quantum gravity
IV. Superstring theoryUV modification of gravitymotivation: quantum gravity, unified theory
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A motivation for IR modification
• Gravity at long distances
Flattening galaxy rotation curves
extra gravity
Dimming supernovae
accelerating universe
• Usual explanation: new forms of matter
(DARK MATTER) and energy (DARK
ENERGY).
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Dark component in the solar system?
Precession of perihelion
observed in 1800’s…
But the right answer wasn’t “dark planet”, it was “change gravity” from Newton to GR.
which people tried to
explain with a “dark
planet”, Vulcan, Mercury
Sun
Mercury
Sun
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Can we change gravity in IR?
Change Theory?Massive gravity Fierz-Pauli 1939
DGP model Dvali-Gabadadze-Porrati 2000
Change State?Higgs phase of gravityThe simplest: Ghost condensationArkani-Hamed, Cheng, Luty and Mukohyama, JHEP 0405:074,2004.
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Massive gravity: history
Yes? No?
Simple question: Can graviton have mass?
May lead to acceleration without dark energy
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Massive gravity: history
Yes? No?
Fierz-Pauli theory (1939)
Unique linear theory without instabilities
(ghosts)
van Dam-Veltman-Zhakharov discontinuity
(1970)
Massless limit ≠General Relativity
Simple question: Can graviton have mass?
May lead to acceleration without dark energy
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Massive gravity: history
Yes? No?
Simple question: Can graviton have mass?
May lead to acceleration without dark energy
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Massive gravity: history
Yes? No?
van Dam-Veltman-Zhakharov discontinuity
(1970)
Massless limit ≠General Relativity
Boulware-Deser ghost (1972)
6th d.o.f.@Nonlinear level Instability (ghost)
Fierz-Pauli theory (1939)
Unique linear theory without instabilities
(ghosts)
Vainshtein mechanism (1972)
Nonlinearity Massless limit = General Relativity
Simple question: Can graviton have mass?
May lead to acceleration without dark energy
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Nonlinear massive gravityde Rham, Gabadadze 2010
de Rham, Gabadadze & Tolley 2010
• First example of fully nonlinear massive
gravity without BD ghost since 1972!
• Purely classical (but technically natural)
• Properties of 5 d.o.f. depend on background
• 4 scalar fields fa (a=0,1,2,3)
• Poincare symmetry in the field space:
Pullback of
Minkowski metric in field space
to spacetime
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Systematic resummationde Rham, Gabadadze & Tolley 2010
No helicity-0 ghost, i.e. no BD ghost, in decoupling limit
K
No BD ghost away from decoupling limit (Hassan&Rosen)
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Massive gravity: history
Yes? No?
Simple question: Can graviton have mass?
May lead to acceleration without dark energy
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No FLRW universe?D’Amico, de Rham, Dubovsky, Gabadadze, Pirtshalava, Tolley (2011)
• Flat FLRW ansatz in “Unitary gauge”gmndxmdxn = -N2(t)dt2 + a2(t)(dx2+dy2+dz2)fa = xa fmn = hmn
• Bianchi “identity” a(t) = const.c.f.
no non-trivial flat FLRW cosmology
• “Our conclusions on the absence of the homogeneous and isotropic solutions do not change if we allow for a more general maximally symmetric 3-space”
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Yes? No?
van Dam-Veltman-Zhakharov discontinuity
(1970)
Massless limit ≠General Relativity
Boulware-Deser ghost (1972)
6th d.o.f.@Nonlinear level Instability (ghost)
D’Amico, et.al. (2011)Non-existence of flat FRW (homogeneous isotropic) universe!
Fierz-Pauli theory (1939)
Unique linear theory without instabilities
(ghosts)
Vainshtein mechanism (1972)
Nonlinearity Massless limit = General Relativity
de Rham-Gabadadze-Tolley (2010)
First example of nonlinear massive gravity without BD ghost since 1972
Simple question: Can graviton have mass?
May lead to acceleration without dark energy
Consistent Theory
found in 2010 but
No Viable Cosmology?
Massive gravity: history
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Good? Bad?
GLM = Gumrukcuoglu-Lin-Mukohyama
DGM = DeFelice-Gumrukcuoglu-Mukohyama
Our recent contributionsCosmological solutions of nonlinear massive gravity
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Open FLRW solutionsGumrukcuoglu, Lin, Mukohyama, arXiv: 1109.3845 [hep-th]
• fmu spontaneously breaks diffeo.
• Both gmu and fmu must respect FLRW symmetry
• Need FLRW coordinates of Minkowski fmu• No closed FLRW chart
• Open FLRW ansatz
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Open FLRW solutionsGumrukcuoglu, Lin, Mukohyama, arXiv: 1109.3845 [hep-th]
• EOM for fa (a=0,1,2,3)
• The first sol implies gmu is Minkowski we consider other solutions
• Latter solutions do not exist if K=0
• Metric EOM self-acceleration
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Self-acceleration
0X
0X
0 0
0 0
0
0
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Good? Bad?
Open universes with self-accelerationGLM (2011a)
D’Amico, et.al. (2011)Non-existence of flat FRW (homogeneous isotropic) universe!
GLM = Gumrukcuoglu-Lin-Mukohyama
DGM = DeFelice-Gumrukcuoglu-Mukohyama
Our recent contributionsCosmological solutions of nonlinear massive gravity
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Good? Bad?
GLM = Gumrukcuoglu-Lin-Mukohyama
DGM = DeFelice-Gumrukcuoglu-Mukohyama
Our recent contributionsCosmological solutions of nonlinear massive gravity
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Summary so far• Nonlinear massive gravity
free from BD ghost
• FLRW backgroundNo closed/flat universeOpen universes with self-acceleration!
• More general fiducial metric fmuclosed/flat/open FLRW universes allowedFriedmann eq does not depend on fmu
• Cosmological linear perturbationsScalar/vector sectors same as in GRTensor sector time-dependent mass
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Nonlinear instabilityDeFelice, Gumrukcuoglu, Mukohyama, arXiv: 1206.2080 [hep-th]
• de Sitter or FLRW fiducial metric
• Pure gravity + bare cc FLRW sol = de Sitter
• Bianchi I universe with axisymmetry + linear perturbation (without decoupling limit)
• Small anisotropy expansion of Bianchi I + linear perturbation nonlinear perturbation around flat FLRW
• Odd-sector: 1 healthy mode + 1 healthy or ghosty mode
• Even-sector: 2 healthy modes + 1 ghosty mode
• This is not BD ghost nor Higuchi ghost.
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Good? Bad?
D’Amico, et.al. (2011)Non-existence of flatFRW (homogeneous isotropic) universe!
NEWNonlinear instability of
FRW solutionsDGM (2012)
Open universes with self-accelerationGLM (2011a)
More general fiducialmetric fmu
closed/flat/open FRW universes allowed
GLM (2011b)
GLM = Gumrukcuoglu-Lin-Mukohyama
DGM = DeFelice-Gumrukcuoglu-Mukohyama
Our recent contributionsCosmological solutions of nonlinear massive gravity
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New class of cosmological solutionGumrukcuoglu, Lin, Mukohyama, arXiv: 1206.2723 [hep-th]
+ De Felice, arXiv: 1303.4154 [hep-th]• Healthy regions with (relatively) large anisotropy
• Are there attractors in healthy region?
• Classification of fixed points
• Local stability analysis
• Global stability analysis
At attractors, physical metric is isotropic but fiducial metric is anisotropic. Anisotropic FLRW universe!
statistical anisotropy expected(suppressed by small mg
2)
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Anisotropy in
Expansion
Anisotropy in fiducial metric
New class of cosmological solutionGumrukcuoglu, Lin, Mukohyama, arXiv: 1206.2723 [hep-th]
+ De Felice, arXiv: 1303.4154 [hep-th]
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Good? Bad?
GLM = Gumrukcuoglu-Lin-Mukohyama
DGM = DeFelice-Gumrukcuoglu-Mukohyama
Anisotropic FRW:
Statistical anisotropy(suppressed by tininess of graviton mass)
with
isotropic expansion
Our recent contributionsCosmological solutions of nonlinear massive gravity
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Quasidilaton• New nonlinear instability [DeFelice, Gumrukcuoglu,
Mukohyama 2012] (i) new backgrounds, or (ii) extended theories
• Quasidilaton: scalar s with global symmetry:
• Action
• Scaling solution = self-accelerating de Sitter(H = const > 0 with = 0)
D’Amico, Gabadadze, Hui, Pirtskhalava, 2012
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Stable extension of quasidilaton
• Self-accelerating solution in the original quasidilaton theory has ghost instability[Gumrukcuoglu, Hinterbichler, Lin, Mukohyama, Trodden 2013; D’Amico, Gabadadze, Hui, Pirtskhalava 2013]
• Simple extension:
• Self-accelerating solution is stable if
arXiv: 1306.5502 [hep-th] /w A. De Felice
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Good? Bad?
GLM = Gumrukcuoglu-Lin-Mukohyama
DGM = DeFelice-Gumrukcuoglu-Mukohyama
DM = DeFelice-Mukohyama
Our recent contributionsCosmological solutions of nonlinear massive gravity
First example of unitary theory
of massive gravity, with
all d.o.f. propagating on strictly
homogeneous and isotropic,
self-accelerating de Sitter
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Summary• Nonlinear massive gravity
free from BD ghost• FLRW background
No closed/flat universeOpen universes with self-acceleration!
• More general fiducial metric fmuclosed/flat/open FLRW universes allowedFriedmann eq does not depend on fmu
• Cosmological linear perturbationsScalar/vector sectors same as in GRTensor sector time-dependent mass
• All homogeneous and isotropic FLRW solutions in the original dRGT theory have ghost
• New class of cosmological solution: anisotropic FLRW statistical anisotropy (suppressed by small mg
2)• Extended quasidilaton: stable self-accelerating FLRW
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Comment: Is there acausality in Massive Gravity?
• Deser-Waldron’s recent claim (2012) on acausality of massive gravity is due to misuse of characteristics analysis [see Izumi-Ong (2013)]
• Characteristics analysis: det (time kinetic matrix) = 0 AFTER solving constraints instantaneous mode acausality
• dRGT eliminates BD ghost would-be BD ghost has vanishing time kinetic term det (time kinetic matrix) = 0 BEFORE solving constraints this does NOT imply acausality
• On the other hand, there are instantaneous modes on self-accelerating branch backgrounds [De Felice- Gumrukcuoglu-Mukohyama (2012)]. So, the issue must be analyzed on each background to establish healthy EFT.
• For example, we can consider an inhomogeneous configuration which connects a self-accelerating branch solution inside and a trivial branch solution outside. If we like, we can consider this as a kind of nonlinear excitation above a trivial branch background. Obviously, this leads to an instantaneous propagation [Deser-Izumi-Ong-Waldron 2013].
• A physical question is really how much energy we need to excite this kind of configuration and whether this energy is above or below the cutoff scale of the EFT on a given background.
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Why alternative gravity theories?
http://map.gsfc.nasa.gov/
Dark Energy
Dark Matter
Inflation
Big Bang
“Singularity”
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BACKUP SLIDES
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Massive gravity: history
Yes? No?
Simple question: Can graviton have mass?
May lead to acceleration without dark energy
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Linear massive gravity (Fierz-Pauli 1939)
• Simple question: Can spin-2 field have mass?
• L = LEH[h] + mg2[hmrhnshmnhrs-(hmnhmn)
2]gmn = hmn + hmn
• Unique linear theory without ghosts
• Broken diffeomorphism no momentum constraint 5 d.o.f. (2 tensor + 2 vector + 1 scalar)
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vDVZ vs Vainshtein
• van Dam-Veltman-Zhakharov (1970)Massless limit ≠ Massless theory = GR5 d.o.f remain PPN parameter g = ½ ≠ 1
• Vainshtein (1972)Linear theory breaks down in the limit.Nonlinear analysis shows continuity and GR is recovered @ r < rV=(rg/mg
4)1/5 .Continuity is not uniform w.r.t. distance.
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Naïve nonlinear theory and BD ghost
• FP theory with hmn gmn
L = LEH[h] + mg2[gmrgnshmnhrs-(gmnhmn)
2]gmn = hmn + hmn
• Vainshtein effect (1972)
• Boulware-Deser ghost (1972)No Hamiltonian constraint @ nonlinear level 6 d.o.f. = 5 d.o.f. of massive spin-2 + 1 ghost
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Stuckelberg fields & Decoupling limitArkani-Hamed, Georgi & Schwarz (2003)
• Stuckelberg scalar fields fa (a=0,1,2,3)
Hmu: covariant version of hmu = gmn - hmn
• Decoupling limitmg 0 , MPl∞ with 5 = (mg
4MPl)1/5 fixed
• Helicity-0 part p:sufficient for analysis of would-be BD ghost
a b
abg Hmn m n mnh f f a a a
xf p
b
ab ah p p
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Would-be BD ghost vs fine-tuningCreminelli, Nicolis, Papucci & Trincherini 2005
de Rham, Gabadadze 2010
• Fierz-Pauli theoryHmu
2 - H2
no ghost
• 3rd orderc1Hmu
3 + c2HHmu2 + c3H3
no ghost if fine-tuned
• …
• any orderno ghost if fine-tuned
0,b
ab ahmn h p p 2H r
mn m n m r np p p
Decouplinglimit
Helicity-0part
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General fiducial metricAppendix of Gumrukcuoglu, Lin, Mukohyama, arXiv: 1111.4107 [hep-th]
• Poincare symmetry in the field space
• de Sitter symmetry in the field space
• FRW symmetry in the field space
Flat/closed/open FLRW cosmology allowedif “fiducial metric” fmn is de Sitter (or FRW) Friedmann equation with the same effective cc
( )a b
abf deSittermn m nf f
( )a b
abf Minkowskimn m nf f
( )a b
abf FLRWmn m nf f
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Cosmological perturbation with any matterGumrukcuoglu, Lin, Mukohyama, arXiv: 1111.4107 [hep-th]
• GR&matter part + graviton mass term
• Separately gauge-invariantCommon ingredient is gij only
• Integrate out yp, Ep and Fpi I(2)s,v = I(2)
GR s,v
• Difference from GR is in the tensor sector only