Can Spacetime curvature induced corrections to Lamb shift be observable?

Can Spacetime curvature induced corrections to Lamb shift be observable? Hongwei Yu Ningbo University and Hunan Normal University Collaborator: Wenting Zhou (Hunan Normal)

OUTLINE • Why-- Test of Quantum effects • How -- DDC formalism • Curvature induced correction to Lamb shift • Conclusion

Why • Quantum effects unique to curved space • Hawking radiation • Gibbons-Hawking effect • Particle creation by GR field • Unruh effect Challenge: Experimental test. Q: How about curvature induced corrections to those already existing in flat spacetimes?

What is Lamb shift? • Theoretical result: The Dirac theory in Quantum Mechanics shows: the states, 2s1/2 and 2p1/2 of hydrogen atom are degenerate. • Experimental discovery: In 1947, Lamb and Rutherford show that the level 2s1/2 lies about 1000MHz, or 0.030cm-1 above the level 2p1/2. Then a more accurate value 1058MHz. The Lamb shift

The Lamb shift and its explanation marked the beginning of modern quantum electromagnetic field theory. In the words of Dirac (1984), “ No progress was made for 20 years. Then a development came, initiated by Lamb’s discovery and explanation of the Lamb shift, which fundamentally changed the character of theoretical physics. It involved setting up rules for discarding … infinities…” • Physical interpretation The Lamb shift results from the coupling of the atomic electron to the vacuum electromagnetic field which was ignored in Dirac theory. • Important meanings Q: What happens when the vacuum fluctuations which result in the Lamb shift are modified?

1. Casimir effect 2. Casimir-Polder force • What happens if vacuum fluctuations are modified? If modes are modified, what would happen? How spacetime curvatureaffects the Lamb shift? Observable?

A neutral atom fluctuating electromagnetic fields The work is done by N. M. Kroll and W. E. Lamb; Their result is in close agreement with the non-relativistic calculation by Bethe. • How • Bethe’s approach, Mass Renormalization (1947) Propose “renormalization” for the first time in history! (non-relativistic approach) • Relativistic Renormalization approach (1948)

A neutral atom fluctuating electromagnetic fields • Welton’s interpretation (1948) The electron is bounded by the Coulomb force and driven by the fluctuating vacuum electromagnetic fields — a type of constrained Brownian motion. • Feynman’s interpretation (1961) It is the result of emission and re-absorption from the vacuum of virtual photons. • Interpret the Lamb shift as a Stark shift

J. Dalibard J. Dupont-Roc C. Cohen-Tannoudji 1997 Nobel Prize Winner • DDC formalism (1980s)

Atomic variable Field’s variable Free field Source field 0≤λ ≤1 a neutral atom Reservoir of vacuum fluctuations

Vacuum fluctuations Vacuum fluctuations Radiation reaction Radiation reaction

Model: a two-level atom coupled with vacuum scalarfield fluctuations. Atomic operator How to separate the contributions of vacuum fluctuations and radiation reaction?

Atom + field Hamiltonian Heisenberg equations for the atom Heisenberg equations for the field Integration ——corresponding to the effect of vacuum fluctuations ——corresponding to the effect of radiation reaction The dynamical equation of HA

uncertain? Symmetric operator ordering

For the contributions of vacuum fluctuations and radiation reaction to the atomic level , with

4. Study the atomic Lamb shift in various backgrounds … Application: 1. Explain the stability of the ground state of the atom; 2. Explain the phenomenon of spontaneous excitation; 3. Provide underlying mechanism for the Unruh effect;

A complete set of modes functions satisfying the Klein-Gordon equation: outgoing ingoing Radial functions Spherical harmonics with the effective potential and the Regge-Wheeler Tortoise coordinate: • Waves outside a Massive body

reflection coefficient transmission coefficient Positive frequency modes → the Schwarzschild time t. Boulware vacuum: The field operator is expanded in terms of these basic modes, then we can define the vacuum state and calculate the statistical functions. D. G. Boulware, Phys. Rev. D 11, 1404 (1975) It describes the state of a spherical massive body.

For the effective potential: Is the atomic energy mostly shifted near r=3M?

with • Lamb shift induced by spacetime curvature For a static two-level atom fixed in the exterior region of the spacetime with a radial distance (Boulware vacuum),

Analytical results In the asymptotic regions: P. Candelas, Phys. Rev. D 21, 2185 (1980).

The revision caused by spacetime curvature. The Lamb shift of a static one in Minkowski spacetime with no boundaries. — The grey-body factor It is logarithmically divergent , but the divergence can be removed by exploiting a relativistic treatment or introducing a cut-off factor.

Vl(r) r 2M 3M The effect of backscattering of field modes off the curved geometry. Consider the geometrical approximation:

1. In the asymptotic regions, i.e., and , f(r)~0, the revision is negligible! Problematic! Discussion: • Near r~3M, f(r)~1/4, the revision is positive and is about 25%! It is potentially observable. The spacetime curvature amplifies the Lamb shift!

? ? sum position 1. Candelas’s result keeps only the leading order for both the outgoing and ingoing modes in the asymptotic regions. 2. The summations of the outgoing and ingoing modes are not of the same order in the asymptotic regions. So, problem arises when we add the two. We need approximations which are of the same order! 3. Numerical computation reveals that near the horizon, the revisions are negative with their absolute values larger than .

Target: In the asymptotic regions, the analytical formalism of the radial functions: • Numerical computation Key problem: How to solve the differential equation of the radial function?

Set: with The recursion relation of ak(l,ω)is determined by the differential of the radial functions and a0(l,ω)=1, ak(l, ω)=0 for k<0,

For the outgoing modes, They are evaluated at large r! with Similarly,

The dashed lines represents and the solid represents .

4M2gs(ω|r) as function of ω and r. For the summation of the outgoing and ingoing modes:

The relative Lamb shift F(r) for the static atom at different position. For the relative Lamb shift of a static atom at position r,

1. The relative Lamb shift decreases from near the horizon until the position r~4M where the correction is about 25%, then it grows very fast but flattens up at about 40M where the correction is still about 4.8%. 2. F(r) is usually smaller than 1, i.e., the Lamb shift of the atom at an arbitrary r is usually smaller than that in a flat spacetime. The spacetime curvature weakens the atomic Lamb shift as opposed to that in Minkowski spacetime! Conclusion:

What about the relationship between the signal emitted from the • static atom and that observed by a remote observer? It is red-shifted by gravity. F(r): observed by a static observer at the position of the atom F′(r): observed by a distant observer at the spatial infinity

Who is holding the atom at a fixed radial distance? circular geodesic motion bound circular orbits for massive particles stable orbits • How does the circular Unruh effect contributes to the Lamb shift? • Numerical estimation

Summary • Spacetime curvature affects the atomic Lamb shift. • It weakens the Lamb shift! • The curvature induced Lamb shift can be remarkably significant • outside a compact massive astrophysical body, e.g., the • correction is ~25% at r~4M, ~16% at r~10M, ~1.6% at r~100M. • The results suggest a possible way of detecting fundamental • quantum effects in astronomical observations.

Thank you!

Can Spacetime curvature induced corrections to Lamb shift be observable?