One dimensional sieve introduction: Difference between revisions
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=<span style="color:Chocolate">So far '''''maxima'''''. What about ''minima'' and more?</span>= | =<span style="color:Chocolate">So far '''''maxima'''''. What about ''minima'' and more?</span>= | ||
''' | The filter (sieve) that finds maxima is a connect-set ''opening'' ('o' sieve). A 'c' sieve finds the connected-set closing, or minima. To work with minima we could: | ||
*invert the signal, process it, and invert it back. | |||
*OR we could substitute a mini for a max: | |||
if type=='o' | |||
v=min(deltas); | |||
elseif type=='c' | |||
v=max(deltas); | |||
end | |||
Actually, the SIVND_m.m implementation uses the latter. It also maintains ''lists of both maxima and minima'' throughout. |
Revision as of 10:51, 17 November 2013
1D Signals to MSERs and granules
Matlab function IllustrateSIV_1 illustrates how MSERs (maximally stable extremal regions) and sieves are related. We start with one dimensional signals before moving to two dimensional images and three dimensional volumes.
Consider a signal, <math>X</math>X=getData('PULSES3WIDE') >blue X=0 5 5 0 0 1 1 4 3 3 2 2 1 2 2 2 1 0 0 0 1 1 0 3 2 0 0 0 6 0 0 |
Filter
Linear
A linear Gaussian filter with <math>\sigma=2</math> attenuates extrema without introducing new ones. But blurring may be a problem. |
h=fspecial('Gaussian',9,2); Y=conv(X,(h(5,:)/sum(h(5,:))),'same');
Non-linear: the starting point for MSER's
scaleA=1; Y1=SIVND_m(X,scaleA,'o');
scaleB=2; Y2=SIVND_m(X,scaleB,'o');
red=double(X)-double(Y1); green=double(Y1)-double(Y2);
Repeat over scales 0 to 15
Increasing the scale (towards the front) removes extrema of increasing length. The algorithm cannot create new maxima (it is an 'o' sieve) it is, therefore, scale-space preserving. |
YY=ones([length(X),1+maxscale]);
for scale=0:maxscale
Y2=SIVND_m(Y1,scale,'o',1,'l',4);
YY(:,scale+1)=Y2';
Y1=Y2; % each stage of the filter (sieve) is idempotent
end
Label the granules
g=SIVND_m(X,maxscale,'o',1,'g',4); g = Number: 10 area: [1 1 1 2 2 2 3 3 5 12] value: [6 1 1 2 5 1 1 1 1 1] level: [6 4 3 2 5 1 3 2 2 1] deltaArea: [5 2 1 7 3 12 2 2 7 19] last_area: [6 3 2 9 5 14 5 5 12 31] root: [29 8 24 24 2 21 8 14 8 8] PictureElement: {1x10 cell}
g.PictureElement
Columns 1 through 9
[29] [8] [24] [2x1 double] [2x1 double] [2x1 double] [3x1 double] [3x1 double] [5x1 double] [12x1 double]
Tracing the granules through scale-space identifies candidate MSER's
We have candidate 1D MSER's
Which is the most stable?
This is a pragmatic judgement. Parameters might include
- how stable over scale (length)
- amplitude (value or level)
- a vector of amplitude over scale
- proximity to others
So far maxima. What about minima and more?
The filter (sieve) that finds maxima is a connect-set opening ('o' sieve). A 'c' sieve finds the connected-set closing, or minima. To work with minima we could:
- invert the signal, process it, and invert it back.
- OR we could substitute a mini for a max:
if type=='o' v=min(deltas); elseif type=='c' v=max(deltas); end
Actually, the SIVND_m.m implementation uses the latter. It also maintains lists of both maxima and minima throughout.