279. Sommerfeld enhancement

This is a brief guest blog post by Roberto Iengo from SISSA (Trieste) who is going to explain us what is Sommerfeld enhancement. Dmitry.

Consider two particles which collide and then undergo some reaction as the result of the collision. An interesting case is the annihilation of two dark matter particles, resulting in the emission of gamma rays or electron positron pairs which could be a long-awaited signal on the dark matter nature. The rate for this process is the product of the cross-section times the incident flux. In the case of the dark matter particles the estimated rate seems to be too low to support the above interpretation of the events which have been observed in some astroparticle experiments.

Here the Sommerfeld enhancement (so named after an early study in the 30′s of the last century) could play a role: if the two colliding particles attract each other, the rate is enhanced.

Classically it is clear that the incident flux is enhanced due to the focusing effect of the attraction; on the other hand also the velocity at which the collision-annihilation takes place is increased. Now the dependence of the cross-section on the velocity varies with the angular momentum: in general it increases with the velocity, except that for zero angular momentum it goes like the inverse of the velocity. Nevertheless, a classical computation for an attractive Coulomb force shows a rate enhancement in all the cases (the classical computation needs a specific assumption on when the collision-annihilation occurs: here it is assumed that it occurs when the two particles are at minimal relative distance).

A more precise computation requires quantum mechanics. Although the applications so far are non-relativistic, it is convenient to describe the phenomenon with the formalism of Quantum Field Theory: two particles propagate in the space-time and interact by exchanging vector bosons (which mediate the attraction) before annihilating. The Feynman graph description of this process gives an integral equation in momentum space relating the full amplitude (i.e. including the effect of the attraction) to the bare (i.e. ignoring the attraction) annihilation amplitude . This equation already incorporates the focusing effect and therefore the full annihilation rate is as usual given by    times the phase space.

In the non-relativistic limit the integral equation can be rewritten as an in-homogeneous Schroedinger equation, containing the attractive potential, relating the full and bare amplitudes in the coordinate space. Its solution gives the full amplitude   in terms of a convolution of a solution of the homogeneous equation with the bare amplitude . Explicit results depend on the behavior of on the momentum and on the parameters of the attractive potential (which has in general a Yukawa form), namely its coupling constant and its range; they can be obtained numerically in the general case, and also analytically for a Coulomb potential, in which case they are quite similar qualitatively to the results of the classical description.

Some references:

L.D.Landau,E.M.Lifshitz “Quantum Mechanics”, Pergamon Press 1958, chapt. XV par. 118.

J.Hisano, S.Matsumoto, M.M.Nojiri, O.Saito, “Non-Perturbative Effect on Dark Matter Annihilation and Gamma Ray Signature from Galactic Center”, Phys. Rev. D71, 063528 (2005).

N.Arkani-Hamed, D.P.Finkbeiner, T.Slatyer, N.Weiner, “A Theory of Dark Matter”, arXiv:0810.0713 [hep-ph].

R.Iengo “Sommerfeld effect: general results from field theory diagrams” arXiv:0902.0688 [hep-ph].