Thirring Model as a Gauge Theory

Abstract

We give another reformulation of the Thirring model (with four-fermion interaction of the current-current type) as a gauge theory and identify it with a gauge-fixed version of the corresponding gauge theory according to the Batalin-Fradkin formalism. Based on this formalism, we study the chiral symmetry breaking of the D-dimensional Thirring model (2<D<4) with N flavors of 4-component fermions. By constructing the gauge covariant effective potential for the chiral order parameter, up to the leading order of 1/N expansion, we show the existence of the second order chiral phase transition and obtain explicitly the critical number of flavors Nc (resp. critical four-fermion coupling Gc) as a function of the four-fermion coupling G (resp. N), below (resp. above) which the chiral symmetry is spontaneously broken.

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