Explain code just starting with matlab ?

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mika on 14 Jun 2014

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https://www.mathworks.com/matlabcentral/answers/134264-explain-code-just-starting-with-matlab

Commented: mika on 25 Jun 2014

Can any one explain this part of code in details please !

if true
 for i=1:length(b)
      inds=round(1:factor:size(b{i},1));
      b{i}=b{i}(inds,:);
  end
end

and below the hole part of code :

    %construct voronoi
if ~boundary
    b=bwboundaries(BW);
else
    b={BW};
end
if factor>1
    for i=1:length(b)
        inds=round(1:factor:size(b{i},1));
        b{i}=b{i}(inds,:);
    end
end
i=1;
inds=[];
while i<=length(b)
    if size(b{i},1)<4
        b(i)=[];
        continue;
    end
    inds(i)=length(b{i}); %#ok<AGROW>
    i=i+1;
end
inds=[0 cumsum(inds)];
p=cell2mat(b);
[v e]=costumVoronoi(p);

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mika on 16 Jun 2014

Edited: mika on 16 Jun 2014

Thank you julia

Below the hole code :

   function [skel v e]=squelette(BW,varargin)
 iptcheckinput(BW,{'numeric' 'logical'},{'real' 'nonsparse' '2d'}, ...
              mfilename, 'BW', 1);
 trim=0;
 factor=-1;
 boundary=false;
 for i=1:length(varargin)
    switch lower(varargin{i})
        case 'trim'
            trim=varargin{i+1};
        case 'fast'
            factor=varargin{i+1};
        case 'boundary'
            boundary=true;
            if nargout~=2
                error(['If boundary is specified, the function cannot 
generate'...
                        char(10) 'the BW inage of the skeleton.' 
 char(10)...
                        'Use [v e]=voronoiSkel(...) instead'])
            end
            if size(BW,2)~=2 
                if size(BW,1)~=2
                    error('If you use the ''boundary'' option, the imput 
must be a 2 x n or n x 2 matrix')
                else
                    BW=BW';
                end
            end
    end
 end
 if trim<1;  trim=pi;  end
 if factor<0; factor=1; end;
 if ~islogical(BW) && ~boundary
    BW = (BW ~= 0);
end
 %construct voronoi
 if ~boundary
    b=bwboundaries(BW);
 else
    b={BW};
end
 if factor>1
    for i=1:length(b)
        inds=round(1:factor:size(b{i},1));
        b{i}=b{i}(inds,:);
    end
end
 i=1;
 inds=[];
 while i<=length(b)
    if size(b{i},1)<4
        b(i)=[];
        continue;
    end
    inds(i)=length(b{i}); %#ok<AGROW>
    i=i+1;
end
 inds=[0 cumsum(inds)];
 p=cell2mat(b);
 [v e]=costumVoronoi(p);
 %clear bad vertices (bv) which are outside of the object.
 if ~boundary
    rv=round(v);
    M=max(p);
    m=min(p);
    bv=v(:,1)<m(1)|v(:,1)>M(1)|v(:,2)>M(2)|v(:,2)<m(2);
    bv2=find(~bv);
    tmp=sub2ind(size(BW),rv(bv2,1),rv(bv2,2));
    bv2(BW(tmp))=[];
    bv=[find(bv); bv2];
 else
    bv=find(~inpolygon(v(:,1),v(:,2),p(:,1),p(:,2)));
end
 be=ismember(e(:,3),bv)|ismember(e(:,4),bv);
 e=e(~be,:);
 clear bv2 m M rv tmp;
 % build distance table
 D=cell(size(b));
 for i=1:length(D);
    tmp=diff(b{i});
    tmp=sqrt(sum(tmp'.^2)');
    D{i}=[0 ;cumsum(tmp)];
end
 % trim
 be=false(size(e,1),1);
 for i=1:size(e,1)
    i1=find(inds>=e(i,1),1,'first')-1;
    i2=find(inds>=e(i,2),1,'first')-1;
    if i1~=i2; continue; end;
    offset=inds(i1);
    contourDistance=abs(D{i1}(e(i,1)-offset)-D{i1}(e(i,2)-offset));
    contourDistance=min(contourDistance,D{i1}(end)-contourDistance);
    realDistance=norm(p(e(i,1),:)-p(e(i,2),:));
    if (contourDistance<realDistance*trim)
        be(i)=1;
    end
 end
 % keep only good edges
 e=e(~be,3:4);
 outputVertices=(nargout>1);
 outputSkel=(nargout~=2);
 if (outputSkel) 
    skel=false(size(BW));
    for i=1:size(e);
        v1=v(e(i,1),:);
        v2=v(e(i,2),:);
        t=linspace(0,1,max(ceil(1.3*norm(v2-v1)),4));
        x=v1(:,1).*t+(1-t).*v2(:,1);
        y=v1(:,2).*t+(1-t).*v2(:,2);
        inds=unique(round([x' y']),'rows');
        skel(sub2ind(size(skel),inds(:,1),inds(:,2)))=1;
    end
end
 if outputVertices
    tmp=1:length(v);
    tmp=~ismember(tmp,e(:,1:2));
    inds=cumsum(tmp);
    e(:,1)=e(:,1)-inds(e(:,1))';
    e(:,2)=e(:,2)-inds(e(:,2))';
    v=v(~tmp,:);
end
 if nargout==2
    skel=v;
    v=e;
end
end
 function [v e]=costumVoronoi(V)
 % Calculates the voronoi diagram of the vertices in V.
 % v should be a n x 2 real matrix.
 % qhull (www.qhull.org) MUST be executable from the current directory.
 %
 % Output: v is the matrix of the Voronoi vertices.
 %         e is the matrix of the Voronoi edges. 
 %            each row of e represents an edge in the following way: 
 %            e(k,[1 2]) are the row indices (in V) of the points which
 %            generated the k-th edge. 
 %            e(k,[3 4]) are the row indices (in v) of the endpoints of the
 %            k-th edge.
 %         
% write to temp file
 namein=tempname;
 fid=fopen(namein,'w');
 fprintf(fid,'%d\n%d\n',2,size(V,1));
 fprintf(fid,'%d %d\n',V');
 fclose(fid);
 [a s]=dos(['qhull v p Fv TI ' namein]);
 if (a~=0)
    delete(namein);
    error(['qhull returned an error:' char(10) s]);
end
 [junk s]=strtok(s);
 [Nv s]=strtok(s);
 Nv=str2double(Nv);
 [v pos]=textscan(s,'%f %f',Nv);
 v=cell2mat(v);
 s=s(pos:end);
 [Ne s]=strtok(s);
 e=double(cell2mat(textscan(s,'%d %d %d %d %d',Ne)));
 e=e(:,2:5);
 e(:,1:2)=e(:,1:2)+1;
 e(e(:,3)==0,:)=[];
 e(e(:,4)==0,:)=[];
 %clean up
 delete(namein);
end

source Skeletonization using voronoi

by Yohai

Explain code just starting with matlab ?

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Explain code just starting with matlab ?

3 Comments Show 1 older commentHide 1 older comment

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Categories

Tags

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3 Comments
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