Chromogravity - An Effective Diff(4,R) Gauge for the IR region of QCD
Abstract
Previous work on the IR regime approximation of QCD in which the dominant contribution comes from a dressed two-gluon effective metric-like field Gμ = gab Aaμ Ab (gab a color SU(3) metric) is reviewed. The QCD gauge is approximated by effective "chromodiffeomorphisms", i.e. by a gauge theory based on a pseudo-diffeomorphisms group. The second-quantized Gμ field, together with the Lorentz generators close on the SL(4,R) algebra. This algebra represents a spectrum generating algebra for the set of hadron states of a given flavor - hadronic "manifields" transforming w.r.t. SL(4,R) (infinite-dimensional) unitary irreducible representations. The equations of motion for the effective pseudo-gravity are derived from a quadratic action describing Riemannian pseudo-gravity in the presence of shear (SL(4,R) covariant) hadronic matter currents. These equations yield p-4 propagators, i.e. a linearly rising confining potential H(r) r, as well as linear J m2 Regge trajectories. The SL(4,R) symmetry based dynamical theory for the QCD IR region is successfully applied to hadron resonances. The pseudo-gravity potential reaches over to Nuclear Physics, where its JP = 2+, 0+ quanta provide for the ground state excitations of the Arima-Iachello Interacting Boson Model.
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