Measuring the Hausdorff Dimension of Quantum Mechanical Paths

Abstract

We measure the propagator length in imaginary time quantum mechanics by Monte Carlo simulation on a lattice and extract the Hausdorff dimension dH. We find that all local potentials fall into the same universality class giving dH=2 like the free motion. A velocity dependent action (S ∫ dt v α) in the path integral (e.g. electrons moving in solids, or Brueckner's theory of nuclear matter) yields dH=α α - 1 if α > 2 and dH=2 if α ≤ 2. We discuss the relevance of fractal pathes in solid state physics and in QFT, in particular for the Wilson loop in QCD.

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