Operator Product Expansion with analytic QCD in tau decay physics

Abstract

We apply a recently constructed model of analytic QCD in the Operator Product Expansion (OPE) analysis of the tau lepton decay data in the V+A channel. The model has the running coupling A(Q2) with no unphysical singularities, i.e., it is analytic. It differs from the corresponding perturbative QCD coupling a(Q2) at high squared momenta |Q2| by terms ~ 1/(Q2)5, hence it does not contradict the ITEP OPE philosophy and can be consistently applied with OPE up to terms of dimension D=8. In evaluations for the Adler function we use a Pade-related renormalization-scale-independent resummation, applicable in any analytic QCD model. Applying the Borel sum rules in the Q2 plane along rays of the complex Borel scale and comparing with ALEPH data of 1998, we obtain the gluon condensate value <(alphas/pi)G2> = 0.0055 +- 0.0047 GeV4. Consideration of the D=6 term gives us the result <O6(V+A)> = (-0.5 +- 1.1) 10-3 GeV6, not incompatible with nonnegative values. The real Borel transform gives us then, for the central values of the two condensates, a good agreement with the experimental results in the entire considered interval of the Borel scales M2. In perturbative QCD in MSbar scheme we deduce similar result for the gluon condensate, 0.0059 +- 0.0049 GeV4, but the value of D=6 condensate is negative, <O6(V+A)> = (-1.8 +- 0.9) 10-3 GeV6, and the resulting real Borel transform for the central values is close to the lower bound of the experimental band.