Thermal field theory to all orders in gradient expansion
arXiv:1302.6361 · doi:10.1088/1742-6596/447/1/012071
Abstract
We present a new perturbative formulation of non-equilibrium thermal field theory, based upon non-homogeneous free propagators and time-dependent vertices. The resulting time-dependent diagrammatic perturbation series are free of pinch singularities without the need for quasi-particle approximation or effective resummation of finite widths. After arriving at a physically meaningful definition of particle number densities, we derive master time evolution equations for statistical distribution functions, which are valid to all orders in perturbation theory and all orders in a gradient expansion. For a scalar model, we make a loopwise truncation of these evolution equations, whilst still capturing fast transient behaviour, which is found to be dominated by energy-violating processes, leading to non-Markovian evolution of memory effects.
8 pages, 4 figures. Prepared for the proceedings of DISCRETE2012: the Third Symposium on Prospects in the Physics of Discrete Symmetries, IST Lisbon, to appear in the Journal of Physics: Conference Series (JPCS). Presented by P. Millington