gusucode.com > 基于matlab软件,实现双目视觉原理的摄像机标定,能根据各视场图像求内、外部参数 > 基于matlab软件,实现双目视觉原理的摄像机标定,能根据各视场图像求内、外部参数/TOOLBOX_calib/edgefinder.m
function [xc,good,bad,type] = edgefinder(xt,I,wintx,winty,wx2,wy2); %[xc] = cornerfinder(xt,I); % %Finds the sub-pixel corners on the image I with initial guess xt %xt and xc are 2xN matrices. The first component is the x coordinate %(horizontal) and the second component is the y coordinate (vertical) % %Based on Harris corner finder method % %Finds corners to a precision below .1 pixel! %Oct. 14th, 1997 - UPDATED to work with vertical and horizontal edges as well!!! %Sept 1998 - UPDATED to handle diverged points: we keep the original points %good is a binary vector indicating wether a feature point has been properly %found. % %Add a zero zone of size wx2,wy2 %July 15th, 1999 - Bug on the mask building... fixed + change to Gaussian mask with higher %resolution and larger number of iterations. % California Institute of Technology % (c) Jean-Yves Bouguet -- Oct. 14th, 1997 % WARNING!!! This function has not been fully tested!!! line_feat = 1; % set to 1 to allow for extraction of line features. xt = xt'; xt = fliplr(xt); if nargin < 4, winty = 5; if nargin < 3, wintx = 5; end; end; if nargin < 6, wx2 = -1; wy2 = -1; end; %mask = ones(2*wintx+1,2*winty+1); mask = exp(-((-wintx:wintx)'/(wintx)).^2) * exp(-((-winty:winty)/(winty)).^2); if (wx2>0) & (wy2>0), if ((wintx - wx2)>=2)&((winty - wy2)>=2), mask(wintx+1-wx2:wintx+1+wx2,winty+1-wy2:winty+1+wy2)= zeros(2*wx2+1,2*wy2+1); end; end; offx = [-wintx:wintx]'*ones(1,2*winty+1); offy = ones(2*wintx+1,1)*[-winty:winty]; resolution = 0.005; MaxIter = 10; [nx,ny] = size(I); N = size(xt,1); xc = xt; % first guess... they don't move !!! type = zeros(1,N); for i=1:N, v_extra = resolution + 1; % just larger than resolution compt = 0; % no iteration yet while (norm(v_extra) > resolution) & (compt<MaxIter), cIx = xc(i,1); % cIy = xc(i,2); % Coords. of the point crIx = round(cIx); % on the initial image crIy = round(cIy); % itIx = cIx - crIx; % Coefficients itIy = cIy - crIy; % to compute if itIx > 0, % the sub pixel vIx = [itIx 1-itIx 0]'; % accuracy. else vIx = [0 1+itIx -itIx]'; end; if itIy > 0, vIy = [itIy 1-itIy 0]; else vIy = [0 1+itIy -itIy]; end; % What if the sub image is not in? if (crIx-wintx-2 < 1), xmin=1; xmax = 2*wintx+5; elseif (crIx+wintx+2 > nx), xmax = nx; xmin = nx-2*wintx-4; else xmin = crIx-wintx-2; xmax = crIx+wintx+2; end; if (crIy-winty-2 < 1), ymin=1; ymax = 2*winty+5; elseif (crIy+winty+2 > ny), ymax = ny; ymin = ny-2*winty-4; else ymin = crIy-winty-2; ymax = crIy+winty+2; end; SI = I(xmin:xmax,ymin:ymax); % The necessary neighborhood SI = conv2(conv2(SI,vIx,'same'),vIy,'same'); SI = SI(2:2*wintx+4,2:2*winty+4); % The subpixel interpolated neighborhood [gy,gx] = gradient(SI); % The gradient image gx = gx(2:2*wintx+2,2:2*winty+2); % extraction of the useful parts only gy = gy(2:2*wintx+2,2:2*winty+2); % of the gradients px = cIx + offx; py = cIy + offy; gxx = gx .* gx .* mask; gyy = gy .* gy .* mask; gxy = gx .* gy .* mask; bb = [sum(sum(gxx .* px + gxy .* py)); sum(sum(gxy .* px + gyy .* py))]; a = sum(sum(gxx)); b = sum(sum(gxy)); c = sum(sum(gyy)); dt = a*c - b^2; xc2 = [c*bb(1)-b*bb(2) a*bb(2)-b*bb(1)]/dt; %keyboard; %if line_feat, G = [a b;b c]; [U,S,V] = svd(G); %keyboard; % If non-invertible, then project the point onto the edge orthogonal: %if (S(1,1)/S(2,2) > 50), % projection operation: xc2 = xc2 + sum((xc(i,:)-xc2).*(V(:,2)'))*V(:,2)'; type(i) = 1; %end; %end; %keyboard; % G = [a b;b c]; % [U,S,V] = svd(G); % if S(1,1)/S(2,2) > 150, % bb2 = U'*bb; % xc2 = (V*[bb2(1)/S(1,1) ;0])'; % else % xc2 = [c*bb(1)-b*bb(2) a*bb(2)-b*bb(1)]/dt; % end; %if (abs(a)> 50*abs(c)), % xc2 = [(c*bb(1)-b*bb(2))/dt xc(i,2)]; % elseif (abs(c)> 50*abs(a)) % xc2 = [xc(i,1) (a*bb(2)-b*bb(1))/dt]; % else % xc2 = [c*bb(1)-b*bb(2) a*bb(2)-b*bb(1)]/dt; % end; %keyboard; v_extra = xc(i,:) - xc2; xc(i,:) = xc2; % keyboard; compt = compt + 1; end end; % check for points that diverge: delta_x = xc(:,1) - xt(:,1); delta_y = xc(:,2) - xt(:,2); %keyboard; bad = (abs(delta_x) > wintx) | (abs(delta_y) > winty); good = ~bad; in_bad = find(bad); % For the diverged points, keep the original guesses: xc(in_bad,:) = xt(in_bad,:); xc = fliplr(xc); xc = xc'; bad = bad'; good = good';