Trivial Vacua, High Orders in Perturbation Theory and Nontrivial Condensates

Abstract

In the limit of an infinite number of colors, an analytic expression for the quark condensate in QCD1+1 is derived as a function of the quark mass and the gauge coupling constant. For zero quark mass, a nonvanishing quark condensate is obtained. Nevertheless, it is shown that there is no phase transition as a function of the quark mass. It is furthermore shown that the expansion of 0 | |0 in the gauge coupling has zero radius of convergence but that the perturbation series is Borel summable with finite radius of convergence. The nonanalytic behavior 0 | |0 mq→0 - NC G2 can only be obtained by summing the perturbation series to infinite order. The sum-rule calculation is based on masses and coupling constants calculated from 't Hooft's solution to QCD1+1 which employs LF quantization and is thus based on a trivial vacuum. Nevertheless the chiral condensate remains nonvanishing in the chiral limit which is yet another example that seemingly trivial LF vacua are not in conflict with QCD sum-rule results.

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