Quantcast
  • Register
PhysicsOverflow is a next-generation academic platform for physicists and astronomers, including a community peer review system and a postgraduate-level discussion forum analogous to MathOverflow.

Welcome to PhysicsOverflow! PhysicsOverflow is an open platform for community peer review and graduate-level Physics discussion.

Please help promote PhysicsOverflow ads elsewhere if you like it.

News

PO is now at the Physics Department of Bielefeld University!

New printer friendly PO pages!

Migration to Bielefeld University was successful!

Please vote for this year's PhysicsOverflow ads!

Please do help out in categorising submissions. Submit a paper to PhysicsOverflow!

... see more

Tools for paper authors

Submit paper
Claim Paper Authorship

Tools for SE users

Search User
Reclaim SE Account
Request Account Merger
Nativise imported posts
Claim post (deleted users)
Import SE post

Users whose questions have been imported from Physics Stack Exchange, Theoretical Physics Stack Exchange, or any other Stack Exchange site are kindly requested to reclaim their account and not to register as a new user.

Public \(\beta\) tools

Report a bug with a feature
Request a new functionality
404 page design
Send feedback

Attributions

(propose a free ad)

Site Statistics

205 submissions , 163 unreviewed
5,082 questions , 2,232 unanswered
5,353 answers , 22,789 comments
1,470 users with positive rep
820 active unimported users
More ...

  Itô or Stratonovich calculus: which one is more relevant from the point of view of physics?

+ 6 like - 0 dislike
2231 views

Langevin equation provides an example of a physical model which involves a differential equation with a stochastic term. Now, I wonder, how should one treat this?

When I studied stochastic processes, I learned about Itô and Stratonovich calculus*. Back then, I just saw these things as technical tools devised to define the stochastic integral in a meningful way. Yes, depending on which one you use, you would obtain some results or some others, but this didn't bother me, since I was looking at these objects as mere mathematical structures.

But, when faced to the Langevin equation, I wonder, how does one make a meaningful interpretation of it? Both Itô and Stratonovich calculus seem like reasonable alternatives, but I don't find any strong argument to prefer one over the other. The point is, there must be a way to decide which type of stochastic calculus we should use! Two different definitions of the stochastic integral will lead to contradictory physics law, which is troublesome.

I believe that the Fokker-Planck equation can be derived from the Langevin equation via Itô's formula, but I don't think there's any way to achieve this using Stratonovich's calculus... But of course, this would be a poor ad hoc argument in favor of Itô's calculus, so this is clearly unsatisfactory.

suming up: how would you proceed to find out which version of the stochastic integral is more convenient to deal with stochastic equations in physics? Is there any physical assumption which makes Itô's calculus more reasonable?

  • A note: Of course, there is a whole parametric family of possible "interpolating" calculus between both Itô and Stratonovich, but I believe these two are the only ones that are relevant: one of them gives rise to the martingale property, and the other one preserves the classical integration-by-parts rule
This post imported from StackExchange Physics at 2016-03-30 10:09 (UTC), posted by SE-user Qwertuy
asked Mar 26, 2016 in Theoretical Physics by Qwertuy (30 points) [ no revision ]
retagged Mar 30, 2016

2 Answers

+ 4 like - 0 dislike

Both are relevant, and "the misconception that Langevin equation is the universal stochastic differential equation for all kinds of noisy systems is responsible for the difficulties mentioned"* in your post.

Take the SDE from Thomas' answer, $$\frac{dy}{dt} = A(y) + C(y)L(t)$$ where $L(t)$ is the noise term. Suppose we can turn the noise off, so we'd only be looking at the isolated, deterministic, system, and suppose that we got: $$\frac{dy}{dt} = A(y)$$ It is thus obvious that the noise term in this case must be interpreted as per Stratonovich, because an Itô interpretation would change the dynamics of the isolated system.

Above we had assumed, as one does, that $\langle L(t)L(t') \rangle = D \delta(t-t')$, but rarely are actual physical processes made out of Dirac deltas. Now if they are not, then by Wong-Zakai, Stratonovich is the only possible interpretation here (i.e. if $L(t)$ is more general, and as it approaches a delta, Stratonovich is the integration form that arises).

Now by turning the noise on and off we have arrived at the conclusion that Stratonovich is the only way forward, but in the very beginning I said that both formulations are relevant. Indeed, what if the noise cannot be separated out?

The important distinction is to make between external and internal sources of noise. We dealt with the external, but what if the noise is internal, and is impossible to turn off like say in chemical reactions? It's not that we have a deterministic process with a noise term slapped on top, we have a stochastic process and one might be able to argue that the averages behave in a deterministic manner, but by no means can then one then simply just add a noise term back on top without more justification: "For internal noise one cannot just postulate a nonlinear Langevin equation or a Fokker-Planck equation and then hope to determine its coefficients from macroscopic data. The more fundamental approach of [the expansion of the master equation] is indispensable."

* Any quotes in my answer have been taken from the definitive book on the matter: Stochastic Processes in Physics and Chemistry by van Kampen, which I strongly suggest you consult for more detailed explanations of the issues and how one goes about dealing with them.

This post imported from StackExchange Physics at 2016-03-30 10:09 (UTC), posted by SE-user alarge
answered Mar 28, 2016 by alarge (40 points) [ no revision ]
Ok, thanks for the answer and the reference. The title is very suggestive indeed.

This post imported from StackExchange Physics at 2016-03-30 10:09 (UTC), posted by SE-user Qwertuy
I am not sure that I completely understand. In the limit that I turn of the multiplicative noise, $b\to 0$ in my notation, Ito and Stratonovich processes are the same. For additive noise, they are the same anyway.

This post imported from StackExchange Physics at 2016-03-30 10:09 (UTC), posted by SE-user Thomas
By the way: In physical systems the noise and the drag are not independent. This is the content of fluctuation-dissipation (FD) relations. Physicists like Stra bettter, because FD relations take on a more transparent form, but its not obvious to me what is wring with Ito.

This post imported from StackExchange Physics at 2016-03-30 10:09 (UTC), posted by SE-user Thomas
+ 2 like - 0 dislike

Both Ito and Stratonovich stochastic PDEs can be used to derive a Fokker-Planck equation. Indeed, for simple one-dimensional processes the Ito process $$ dx = a\, dt + b\, dW(t) $$ is equivalent to the Stratonovich process $$ dx =\left( a\,-\frac{1}{2}b\partial_x b\right) dt + b\, dW(t) $$ The answer is then that both are physically reasonable, for a given FP equation I can find both and Ito and a Stratonovich process that will realize it. These are physically equivalent.

Having said this, Physicists tend to think of Stratonovich as the more reasonable scheme, because the FP equation is the one that can be derived by taking moments and "naive" integration by parts.

This post imported from StackExchange Physics at 2016-03-30 10:09 (UTC), posted by SE-user Thomas
answered Mar 27, 2016 by tmschaefer (720 points) [ no revision ]
Thanks for the nice answer. It helped to clarify

This post imported from StackExchange Physics at 2016-03-30 10:09 (UTC), posted by SE-user Qwertuy

Your answer

Please use answers only to (at least partly) answer questions. To comment, discuss, or ask for clarification, leave a comment instead.
To mask links under text, please type your text, highlight it, and click the "link" button. You can then enter your link URL.
Please consult the FAQ for as to how to format your post.
This is the answer box; if you want to write a comment instead, please use the 'add comment' button.
Live preview (may slow down editor)   Preview
Your name to display (optional):
Privacy: Your email address will only be used for sending these notifications.
Anti-spam verification:
If you are a human please identify the position of the character covered by the symbol $\varnothing$ in the following word:
p$\hbar$ys$\varnothing$csOverflow
Then drag the red bullet below over the corresponding character of our banner. When you drop it there, the bullet changes to green (on slow internet connections after a few seconds).
Please complete the anti-spam verification




user contributions licensed under cc by-sa 3.0 with attribution required

Your rights
...