How can I find a minimum only before a peak has been detected?

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I have the following graph in which I used function findpeaks and MinPeakHeight to find the peaks that I'm interested in.
[pks,locs]=findpeaks(filter_sgo,'MinPeakHeight',limiar,'MinPeakDistance',minpkdist);
Now I want to find the local minimums but only before the peaks that I have already detected (red points of the picture). I know I have to invert the signal and use findpeaks again, but I can't figure out how to only detect before a peak.
Thanks a lot.
  7 Comments
jonas
jonas on 23 May 2018
If you post the data (or part of the data) and your code, then it would be easier to help you. It would also be easier to post a good answer. Anyway, I'm guessing this line is incorrect
if loc_min(1,:)< locs(1,j) && loc_min(1,:)>locs(1,j)-2000
you are never using i in your loop, perhaps : should be replaced by i?
Folakemi Omotoye
Folakemi Omotoye on 24 Jul 2018
Hi Anna, How did you get this kinda plot. I want to get a similar plot to this

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Accepted Answer

jonas
jonas on 23 May 2018
Edited: jonas on 23 May 2018
What you are looking for seems to be the beginning of the peak, which is not necessarily a valley. A simple method to approximate those values would be to count backwards from each peak, and find the location when the signal intercepts a predefined threshold. Here's a simple example. You may recognize the peaks from the documentation on findpeaks.
x = linspace(0,1,1000);
Pos = [1 2 3 5 7 8]/10;
Hgt = [3 4 4 2 2 3];
Wdt = [2 6 3 3 4 6]/100;
for n = 1:length(Pos)
Gauss(n,:) = Hgt(n)*exp(-((x - Pos(n))/Wdt(n)).^2);
end
PeakSig = sum(Gauss);
%%example starts here
[pks,locs] = findpeaks(PeakSig);
locs=[1 locs];
thres=0.5; %set threshold
win=diff(locs)
mins=nan(size(win))
for i=1:numel(win);
ind=find(PeakSig(locs(i):locs(i+1))<thres);
if ~isempty(ind)
mins(i)=max(ind)+locs(i);
end
end
mins(isnan(mins))=[];
figure;hold on
findpeaks(PeakSig)
plot(mins,PeakSig(mins),'rx')
  3 Comments
Image Analyst
Image Analyst on 24 May 2018
Or (what I think might be better) is to descend from the peak until you're less than the threshold, and keep going until the values start to turn around and increase again.

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