Hoelder Inequalities and Isospin Splitting of the Quark Scalar Mesons
Abstract
A Hoelder inequality analysis of the QCD Laplace sum-rule which probes the non-strange (n n) components of the I=0,1 (light-quark) scalar mesons supports the methodological consistency of an effective continuum contribution from instanton effects. This revised formulation enhances the magnitude of the instanton contributions which split the degeneracy between the I=0 and I=1 channels. Despite this enhanced isospin splitting effect, analysis of the Laplace and finite-energy sum-rules seems to preclude identification of a0(980) and a light broad sigma-resonance state as the lightest isovector and isoscalar spin-zero n n mesons. This apparent decoupling of sigma [ f0(400-1200)] and a0(980) from the quark n n scalar currents suggests either a non-q q or a dominantly s s interpretation of these resonances, and further suggests the possible identification of the f0(980) and a0(1450) as the lightest I=0,1 scalar mesons containing a substantial n n component.
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