# Fitting sigmoid to data

There are many curve fitting and interpolation tools like polyfit (or even this nice logfit toolbox I found here), but I can't seem to find anything that will fit a `sigmoid` function to my x-y data.

Does such a tool exist or do I need to make my own?

If you have the Statistics Toolbox installed, you can use nonlinear regression with `nlinfit`:

``````sigfunc = @(A, x)(A(1) ./ (A(2) + exp(-x)));
A0 = ones(size(A)); %// Initial values fed into the iterative algorithm
A_fit = nlinfit(x, y, sigfunc, A0);
``````

Here `sigfunc` is just an example for a sigmoid function, and `A` is the vector of the fitting coefficients.

• I found the following sigfunc to be more useful `sigfunc = @(A, x)(A(1) ./ (1 + exp(-A(2)*x)));` – ohnoplus Dec 15 '15 at 18:42
• @user92519 No problem, I only gave this as an example. – Eitan T Dec 15 '15 at 19:03
• Hello. What do you mean by `vector of the fitting coefficients`? – Shoham Debnath Jul 2 '16 at 11:49
• @ShohamDebnath what I mean is that vector `A` is the vector of coefficients that defines the fitted sigmoid. To clarfiy that, you can look at the definition of `sigfunc`. – Eitan T Jul 3 '16 at 7:13

`nlinfit`, and especially `gatool`, are big hammers for this problem. A sigmoid is not a specific function. Most commonly it is taken to be the same as the logistic function (also often the most efficient to calculate):

``````y = 1./(1+exp(-x));
``````

or a generalized logistic. But all manner of curves can have sigmoidal shapes. If you know if your data corresponds to one in particular, fitting can be improved and more efficient methods can be applied. For example, the error function (`erf`) has a sigmoidal shape and shows up in the CDF of the normal distribution. If you know that your data is the result of a Gaussian process (i.e., the data is the CDF) and you have the Stats toolbox, you can use the `normfit` function. This function is based on maximum likelihood estimation (MLE). If you end up needing to write a custom fitting function - say, for performance reasons - I'd investigate MLE techniques for the particular form of sigmoid that you'd like to fit.

I would suggest you use MATLAB's Global Optimization Toolbox, and in particular the Genetic Algorithm Solver, which you can use for your problem by optimizing (= finding the best fit for your data) the sigmoid function's parameters through genetic algorithm. It has a GUI that is easy to use.

The Genetic Algorithm Solver's GUI, which you can call using `gatool`: