Dynamical Zero Modes and Criticality in Continuous Light Cone Quantization of Phi41+1
Abstract
Critical behaviour of the 2D scalar field theory in the LC framework is reviewed. The notion of dynamical zero modes is introduced and shown to lead to a non trivial covariant dispersion relation only for Continuous LC Quantization (CLCQ). The critical exponent η is found to be governed by the behaviour of the infinite volume limit under conformal transformations properties preserving the local LC structure. The β-function is calculated exactly and found non-analytic, with a critical exponent ω=2, in agreement with the conformal field theory analysis of Calabrese et al.
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