Fit curve to nonstandard data

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Pippa Williams
Pippa Williams on 15 Jun 2018
Answered: Star Strider on 16 Jun 2018
I'm trying to fit a curve to 2 data sets, image attached. I want to end up with a vector (or function) which defines, for any given x value, what the most likely y value is. It should have the property y(x.1)<= y(x.2) i.e. for an increase in x you get an increase in y.
The data won't fit any traditional function - it's stepped and weirdly curved.
I started by defining a linspace for x, and then trying the median of values in a range around that x value:
XSpace = (0:3500)';
YSpace = 0*XSpace;
for index = 1:size(X)
YSpace(index,1) = median(Y(and(X>(XSpace(index)-100),X<(XSpace(index)+100))));
end
However, this is skewed as there aren't the same number of data points for any given X value (e.g. if there are more data points below the X value of interest than above, the median will be skewed low).
I've tried sorting the scatter data, and then applying a range of filters, but I struggle to maintain the shape. I thought a median filter would work, but it doesn't handle when the outliers become too frequent. I'm also struggling as there's lots of data for low x, and much less data for high x.
Has anyone got any bright ideas about how to fit a curve/space to this data? It seems very obvious looking at the data, how the curve should look, but I'm struggling to work out how to fit it with an algorithm.

Answers (2)

Stephan
Stephan on 15 Jun 2018
Edited: Stephan on 15 Jun 2018
Hi,
if you have the curve fitting toolbox, you could consider this for your purpose:
You also find an example which could meet your requirements here at about the half of the page:
Best regards
Stephan

Star Strider
Star Strider on 16 Jun 2018
I am not certain what you want to do. The problem is that you have several sets of data in each vector, so taking the unique ‘x’ values and taking the mean of the corresponding ‘y’ values may be the only possible approach. You can then use interp1 to interpolate to get the ‘y’ corresponding to any ‘x’ within the limits of ‘x’ and ‘y’ for each data set.
The Code
D = load('DataForForumQuestion.mat');
XData1 = D.XData1;
YData1 = D.YData1;
XData2 = D.XData2;
YData2 = D.YData2;
[UX1,~,ic] = unique(XData1); % Unique ‘x’ Values & Indices For Set #1
UY1 = accumarray(ic,YData1, [], @mean); % Use ‘bsxfun’ To Calculate ‘mean’ Of ‘y’ Values Corresponding To Unique ‘x’ Values
[UX2,~,ic] = unique(XData2); % Unique ‘x’ Values & Indices For Set #2
UY2 = accumarray(ic,YData2, [], @mean); % Use ‘bsxfun’ To Calculate ‘mean’ Of ‘y’ Values Corresponding To Unique ‘x’ Values
figure(1)
plot(XData1, YData1, '-b') % Display Raw Data
hold on
plot(XData2, YData2, '-r')
hold off
axis([xlim 0 350])
figure(2)
plot(UX1, UY1, '-b') % Display Processed Data
hold on
plot(UX2, UY2, '-r')
hold off
axis([xlim 0 350])
XD1i = 1502; % Choose ‘x’ To Interpolate
YD1i = interp1(UX1, UY1, XD1i); % Calculate Corresponding ‘y’
XD2i = 1502; % Choose ‘x’ To Interpolate
YD2i = interp1(UX2, UY2, XD2i); % Calculate Corresponding ‘y’
The Plot
XD1i =
1502
YD1i =
157.2170
XD2i =
1502
YD2i =
68.2821

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