Conformal symmetry breaking and degeneracy of high-lying unflavored mesons

Abstract

We show that though conformal symmetry can be broken by the dilaton, such can happen without breaking the conformal degeneracy patterns in the spectra. We departure from R1XS3 slicing of AdS5 noticing that the inverse radius, R, of S3 relates to the temperature of the deconfinement phase transition and has to satisfy, c/R >> QCD. We then focus on the eigenvalue problem of the S3 conformal Laplacian, given by 1/R2 (K2+1), with K2 standing for the Casimir invariant of the so(4) algebra. Such a spectrum is characterized by a (K+1)2 fold degeneracy of its levels, with K∈ [0,∞). We then break the conformal S3 metric as, ds2=e-b ((1+b2/4) d2 +2 (dθ 2 +2θ d 2)), and attribute the symmetry breaking scale, b2c2/R2, to the dilaton. We show that such a metric deformation is equivalent to a breaking of the conformal curvature of S3 by a term proportional to b , and that the perturbed conformal Laplacian is equivalent to (K2 +cK), with cK a representation constant, and K2 being again an so(4) Casimir invariant, but this time in a representation unitarily inequivalent to the 4D rotational. In effect, the spectra before and after the symmetry breaking are determined each by eigenvalues of a Casimir invariant of an so(4) algebra, a reason for which the degeneracies remain unaltered though the conformal group symmetry breaks at the level of the representation of its algebra. We fit the S3 radius and the 2c2b/R2 scale to the high-lying excitations in the spectra of the unflavored mesons, and observe the correct tendency of the c /R=373 MeV value to notably exceed QCD. The size of the symmetry breaking scale is calculated as c b/R=673.7 MeV.