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The Cosmological Constant Problem & Self-tuning Mechanism. Rong-Gen Cai Institute of Theoretical Physics Chinese Academy of Sciences. The Cosmological Constant:. (A. Einstein, 1917). The Static Universe; “Greatest Blunder”.
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The Cosmological Constant Problem & Self-tuning Mechanism Rong-Gen Cai Institute of Theoretical Physics Chinese Academy of Sciences
The Cosmological Constant: (A. Einstein, 1917) The Static Universe; “Greatest Blunder”
The Old Cosmological Constant Problem: Quantum Field Theory Vacuum Energy Density The Cosmological Constant QUESTION: Why ?
近年的天文观测支持: 暴涨模型⊕暗物质 ⊕ 暗能量 22% ⊕ 73% 挑战:暴涨模型 ? 暗物质 ? 暗能量 ? Inflation Model: A. Guth, 1981 Dark Matter: Dark Energy:
The New Cosmological Constant Problem: QUESTION: 1) why ? 2) why ? Dark Energy: Quintenssence ?
IF THE COSMOLOGICAL CONSTANT EXISTS: Cosmological Event Horizon: Entropy: Finite Degrees of Freedom: Consistent With String Theory? T. Banks, 2000: The Cosmological Constant is an Input of the Fundamental Theory!
To Solve Those Problems Including the Cosmological Constant Problem One Needs CRAZY Ideas (M. S. Turner)
Brane World Scenario: • N. Arkani-Hamed et al, 1998 • factorizable product • 2) L. Randall and R. Sundrum, 1999 • warped product in AdS_5 y RS1: RS2:
RS Brane Cosmology: where = 0 Fine-Tuning
The New Approach to the Cosmological Constant Problem in the Brane World Scenario The Self-tuning Mechanism
The Case of Co-dimension one Brane hep-th/0001197, hep-th/0001206 Consider the Following Action:
To incorporate the effects of SM quantum loops, one may consider the effective action:
Consider the following 5D metric with Poincare symmetry: And the SM matters:
The equations of motion in the bulk: where Consider the delta function source on the brane and Z_2 symmetry, y ---> -y:
Key point: With the variable , the equations of motion are completely independent of the effective potential V_extremal.
Recalling the conformal coupling It Pohibits both the de Sitter Symmetry and Anti-de Sitter Symmetry on the Brane The Flat Domain Wall Solution is the Unique One, for any Value of the Brane Tension
Some Remarks: 1) There is a naked curvature singularity at y
2) Finite4D Planck Scale The zero mode tensor fluctuations correspond to a massless 4D graviton with finite Planck scale
3) Why it works The bulk action has a shift symmetry: results in an associated conserved current:
However, the coupling to the brane tension breaks this symmetry. The SM vacuum energy is converted into a current emerging on the brane and ending in the singularity region.
More general coupling to the brane tension: with * when a=2b=3/4, the action agrees with tree level string theory with phi as the dilaton.
A fine tuning is still needed! hep-th/0002164 Here
One Solution with Assumption: are integration constants. Here 1) Continuity at x_5=0determines one of them, say,d_2.
2) The condition on the first derivatives at x_5=0 determinesc_1andc_2: The Solution Does Exist for any Value of V and b.
At two singular points: Two more boundary conditions: Here
IF cutting off the fifth dimension by defining The boundary conditions then reduce to:
The Brane Contributions to the 4D Cosmological Constant: As a result:
The Case of Co-dimension two Brane hep-th/0302067, hep-th/0302129 hep-th/0309042, hep-th/0309050 Consider and action
The Maxwell Field Has the Solution The Einstein’s Equations: The Stress-Energy Tensor:
Here A Static and Stable Solution is provided
Now Add Brane to the System with The Stress-Energy Tensor of Branes:
Rewrite the metric of two-dim. sphere Two branes atr=0 and r= infinity. obeys the following equation:
By a coordinate transformation, the solution becomes where and This solution describes two-sphere, but a wedge is removed and opposite sides are identified.
Finally with The brane is always flat for any tension.
