English

Assigning probabilities to non-Lipschitz mechanical systems

Classical Physics 2022-01-03 v2 Computational Physics Data Analysis, Statistics and Probability

Abstract

We present a method for assigning probabilities to the solutions of initial value problems that have a Lipschitz singularity. To illustrate the method, we focus on the following toy example: d2r(t)dt2=ra\frac{d^2r(t)}{dt^2} = r^a, r(t=0)=0r(t=0) =0, and dr(t)dtr(t=0)=0\frac{dr(t)}{dt}\mid_{r(t=0)} =0, with a]0,1[a \in ]0,1[. This example has a physical interpretation as a mass in a uniform gravitational field on a frictionless, rigid dome of a particular shape; the case with a=1/2a=1/2 is known as Norton's dome. Our approach is based on (1) finite difference equations, which are deterministic; (2) elementary techniques from alpha-theory, a simplified framework for non-standard analysis that allows us to study infinitesimal perturbations; and (3) a uniform prior on the canonical phase space. Our deterministic, hyperfinite grid model allows us to assign probabilities to the solutions of the initial value problem in the original, indeterministic model.

Keywords

Cite

@article{arxiv.2001.10375,
  title  = {Assigning probabilities to non-Lipschitz mechanical systems},
  author = {Danny E. P. Vanpoucke and Sylvia Wenmackers},
  journal= {arXiv preprint arXiv:2001.10375},
  year   = {2022}
}

Comments

12 figures

R2 v1 2026-06-23T13:22:59.634Z