In this paper we develop a path-integral formulation of {ital classical} Hamiltonian dynamics, that means we give a functional-integral representation of {ital classical} transition probabilities.… Expand

In this paper we generalize previous work done on the path-integral approach to classical mechanics and its symmetries. We study in particular the case that the components of the symplectic two-form… Expand

In this paper we study the interplay between the classical and quantum anholonomy effects (Hannay's angle and Berry's phase). When a quantum system with a finite number of energy levels has a Berry… Expand

The method of Parisi and Wu of quantizing gauge theories (stochastic quantization) is reformulated using path integrals. We first review how the gauge fixing enters through the initial condition of… Expand

There has recently been some criticism by Noga on the hidden supersymmetry discovered by Parisi and Sourlas (and many other authors) in parabolic stochastic equations. We will show in this paper how… Expand