Evidence against naive truncations of the OPE from e+e- hadrons below charm

Abstract

The operator product expansion (OPE), truncated in dimension, is employed in many contexts. An example is the extraction of the strong coupling, αs, from hadronic τ-decay data, using a variety of analysis methods based on finite-energy sum rules. Here, we reconsider a long-used method, which parametrizes non-perturbative contributions to the I=1 vector and axial vacuum polarizations with the OPE, setting several higher-dimension coefficients to zero in order to implement the method in practice. The assumption that doing this has a negligible effect on the value of αs is tantamount to the assumption that the low-dimension part of the OPE converges rapidly with increasing dimension near the τ mass. Were this assumption valid, it would certainly have to be valid at energies above the τ mass as well. It follows that the method can be tested using data obtained from e+e-hadrons, as they are not limited by the kinematic constraints of τ decays. We carry out such an investigation using a recent high-precision compilation for the R-ratio, arguing that it provides insights into the validity of the strategy, even if it probes a different, though related channel. We find that e+e--based tests call into question the implied assumption of rapid convergence of the low-dimension part of the OPE around the τ mass, and thus underscore the need to restrict finite-energy sum-rule analyses to observables which receive only contributions from lower-order terms in the OPE.