nLab time-reversible stochastic process

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Context

Physics

physics, mathematical physics, philosophy of physics

Surveys, textbooks and lecture notes

theory (physics), model (physics)

experiment, measurement, computable physics

Measure and probability theory

Contents

Idea

A stochastic process is time-reversible if it is symmetric under time reversal.

This symmetry is meant in a stochastic sense: it says that given any trajectory, its reverse trajectory has the same probability of happening.

Definition

A stationary stochastic process (X t) tT(X_t)_{t\in T} is called time-reversible if and only if for all finite t 1<<t nt_1 \lt \dots \lt t_n, we have that the finite marginals

(X t 1,,X t n)and(X t n,,X t 1) (X_{t_1},\dots,X_{t_n}) \qquad and \qquad (X_{t_n},\dots,X_{t_1})

have the same joint distribution.

(The definition outside the stationary case does not seem to appear in the literature.)

Examples

References

category: probability

Last revised on January 31, 2025 at 17:48:03. See the history of this page for a list of all contributions to it.

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