Bound on the curvature of the Isgur-Wise function of the baryon semileptonic decay Lambdab -> Lambdac + l + nu

Abstract

In the heavy quark limit of QCD, using the Operator Product Expansion, the formalism of Falk for hadrons or arbitrary spin, and the non-forward amplitude, as proposed by Uraltsev, we formulate sum rules involving the Isgur-Wise function (w) of the baryon transition b c , where the light cloud has jP=0+ for both initial and final baryons. We recover the lower bound for the slope 2 = - ' (1) ≥ 0 obtained by Isgur et al., and we generalize it by demonstrating that the IW function (w) is an alternate series in powers of (w-1), i.e. (-1)n (n) (1) ≥ 0. Moreover, exploiting systematically the sum rules, we get an improved lower bound for the curvature in terms of the slope, σ2 = " (1) ≥ 3 5 [2 + (2)2]. This bound constrains the shape of the Isgur-Wise function and it will be compelling in the analysis of future precise data on the differential rate of the baryon semileptonic decay b c , that has a large measured branching ratio, of about 5%.