Subleading form factors at order 1/mQ in terms of leading quantities using the non-forward amplitude in HQET
Abstract
We consider the non-forward amplitude within the Heavy Quark Effective theory. We show that one can obtain new information on the subleading corrections in 1/mQ. We illustrate the method by deriving new simple relations between the functions Xsi3(w) and Lambdabar Xsi(w) and the sums Sumn DeltaE(n)j tau(n)j(1) tau(n)j(w) (j=1/2,3/2), that involve leading quantities, namely the Isgur-Wise functions tau(n)j(w) and the level spacings DeltaE(n)j. The simplicity of our results follows from the fact that, for the non-forward amplitude B(vi)->D(n)(v')->B(vf), there are three variables (wi,wf,wif)=(vi.v',vf.v',vi.vf) independent in a certain domain, and we consider the zero recoil frontier (w,1,w) where only a finite number of jP states contribute (1/2+,3/2+). These sum rules reduce to known results at w=1, for Lambdabar obtainted by Voloshin, and for Xsi3(1) obtained by Le Yaouanc et al. and by Uraltsev, and generalizes them to all values of w. We discuss phenomenological applications of these results, in particular the check of Bakamjian-Thomas quark models and the comparison with the QCD Sum Rules approach.
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