Consider the following data generated on which filter is added to get suitable deformation:
standarddev=0.1; [x,y] = pol2cart(0:0.01:2*pi, 1); x1=x-filter(.1*(1-.1), [1 -.1], cumsum(standarddev*randn(size(x)))); y1=y-filter(.1*(1-.1), [1 -.1], cumsum(standarddev*randn(size(y)))); plot(x1,y1);
I want to study correlation of mean error (between x and x1, and y and y1 independently) and standard deviation.
I am calculating relative mean error by using
My variable parameter in the above data will be standard deviation (e.g. 0,0.05,0.1,...,1,...,2). i.e. I want to study how variation in amount of noise added effects error detected.
I am not getting good correlation between error and standard deviation (as one would expect) because I have added some noise and not just random error whose amount is varying with standard deviation.
How can I take into account the noise added to get good correlation between error and noise.