Get derivatives from noisy data
47 views (last 30 days)
Show older comments
Hi everyone, here i had a problem when i want to get derivatives from a surface.
For my data, first i use sft to get a fitting model (cubic interpolant was used when data have no noise) and then use Differentiate(f,x,y) function to get the derivatives. it worked well for the non-noisy data. but when i add noise, i have to use other method to smooth and fit the data, i used Lowess. it gave me a good fitting. but when i use differentiate(f,x,y) to get derivatives, the results are terrible. there are many big peaks and valleies even when they should be very smooth. I tried to decrease the noise level. But for noise higher than 2%, I still cannot get good results.
I wonder is there any other method to smooth noisy data and recover the real data and their derivatives. And I think how much smoothing yield accurate derivative is difficult to know. Any suggestion? Your answer will be greatly appreciated.
Cheers Hui
0 Comments
Accepted Answer
Matt Fig
on 3 Jun 2011
Numerical differentiation with noisy data is notoriously unreliable. Have a look at this article to see one method for addressing the issue.
5 Comments
Tobias
on 21 Jun 2018
Hi,
Here is some code available to perform total variation:
https://github.com/JeffreyEarly/GLNumericalModelingKit/blob/master/Matlab/TVRegDiff.m https://sites.google.com/site/dnartrahckcir/home/tvdiff-code
Link to the article, Best, Toby
shamraiz shamraiz
on 24 Apr 2019
The paper discussed by @Loginatorist has a broken link -- it can be found here:
https://www.researchgate.net/publication/255907171_Numerical_Differentiation_of_Noisy_Nonsmooth_Data
More Answers (1)
Rory Staunton
on 30 Jun 2011
I am working on a similar problem, but only on univariate data, and I am still exploring different approaches. One that has worked for me reasonably well is essentially what could be called 'automatic piecewise linear fitting by threshold-limited iterative fit range extension'. Extend the range of your fit until your deviation gets too high, then begin fitting in the adjacent region. There are a number of tricks that can be used to improve on this, but that's the basic idea. Translating this to surface fitting though could be a much harder problem...
0 Comments
See Also
Categories
Find more on Data Preprocessing in Help Center and File Exchange
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!