Symplectic Quantization and Minkowskian Statistical Mechanics: simulations on a 1+1 lattice

Abstract

We introduce symplectic quantization, a novel functional approach to quantum field theory which allows to sample quantum fields fluctuations directly in Minkowski space-time, at variance with the traditional importance sampling protocols, well defined only for Euclidean Field Theory. This importance sampling procedure is realized by means of a deterministic dynamics generated by Hamilton-like equations evolving with respect to an auxiliary time parameter τ. In this framework, expectation values over quantum fluctuations are computed as dynamical averages along the trajectories parameterized by τ. Assuming ergodicity, this is equivalent to sample a microcanonical partition function. Then, by means of a large-M calculation, where M is the number of degrees of freedom on the lattice, we show that the microcanonical correlation functions are equivalent to those generated by a Minkowskian canonical theory where quantum fields fluctuations are weighted by the factor (S/ ), with S being the original relativistic action of the system.

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