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source: trunk/src/toolbox_calib/project_points2.m @ 800

Last change on this file since 800 was 725, checked in by sommeria, 11 years ago
toolbox_calib added to svn
File size: 9.2 KB

Rev	Line
[725]	1	function [xp,dxpdom,dxpdT,dxpdf,dxpdc,dxpdk,dxpdalpha] = project_points2(X,om,T,f,c,k,alpha)
	2
	3	%project_points2.m
	4	%
	5	%[xp,dxpdom,dxpdT,dxpdf,dxpdc,dxpdk] = project_points2(X,om,T,f,c,k,alpha)
	6	%
	7	%Projects a 3D structure onto the image plane.
	8	%
	9	%INPUT: X: 3D structure in the world coordinate frame (3xN matrix for N points)
	10	% (om,T): Rigid motion parameters between world coordinate frame and camera reference frame
	11	% om: rotation vector (3x1 vector); T: translation vector (3x1 vector)
	12	% f: camera focal length in units of horizontal and vertical pixel units (2x1 vector)
	13	% c: principal point location in pixel units (2x1 vector)
	14	% k: Distortion coefficients (radial and tangential) (4x1 vector)
	15	% alpha: Skew coefficient between x and y pixel (alpha = 0 <=> square pixels)
	16	%
	17	%OUTPUT: xp: Projected pixel coordinates (2xN matrix for N points)
	18	% dxpdom: Derivative of xp with respect to om ((2N)x3 matrix)
	19	% dxpdT: Derivative of xp with respect to T ((2N)x3 matrix)
	20	% dxpdf: Derivative of xp with respect to f ((2N)x2 matrix if f is 2x1, or (2N)x1 matrix is f is a scalar)
	21	% dxpdc: Derivative of xp with respect to c ((2N)x2 matrix)
	22	% dxpdk: Derivative of xp with respect to k ((2N)x4 matrix)
	23	%
	24	%Definitions:
	25	%Let P be a point in 3D of coordinates X in the world reference frame (stored in the matrix X)
	26	%The coordinate vector of P in the camera reference frame is: Xc = R*X + T
	27	%where R is the rotation matrix corresponding to the rotation vector om: R = rodrigues(om);
	28	%call x, y and z the 3 coordinates of Xc: x = Xc(1); y = Xc(2); z = Xc(3);
	29	%The pinehole projection coordinates of P is [a;b] where a=x/z and b=y/z.
	30	%call r^2 = a^2 + b^2.
	31	%The distorted point coordinates are: xd = [xx;yy] where:
	32	%
	33	%xx = a * (1 + kc(1)r^2 + kc(2)r^4 + kc(5)r^6) + 2kc(3)ab + kc(4)(r^2 + 2a^2);
	34	%yy = b * (1 + kc(1)r^2 + kc(2)r^4 + kc(5)r^6) + kc(3)(r^2 + 2b^2) + 2kc(4)ab;
	35	%
	36	%The left terms correspond to radial distortion (6th degree), the right terms correspond to tangential distortion
	37	%
	38	%Finally, convertion into pixel coordinates: The final pixel coordinates vector xp=[xxp;yyp] where:
	39	%
	40	%xxp = f(1)(xx + alphayy) + c(1)
	41	%yyp = f(2)*yy + c(2)
	42	%
	43	%
	44	%NOTE: About 90 percent of the code takes care fo computing the Jacobian matrices
	45	%
	46	%
	47	%Important function called within that program:
	48	%
	49	%rodrigues.m: Computes the rotation matrix corresponding to a rotation vector
	50	%
	51	%rigid_motion.m: Computes the rigid motion transformation of a given structure
	52
	53
	54	if nargin < 7,
	55	alpha = 0;
	56	if nargin < 6,
	57	k = zeros(5,1);
	58	if nargin < 5,
	59	c = zeros(2,1);
	60	if nargin < 4,
	61	f = ones(2,1);
	62	if nargin < 3,
	63	T = zeros(3,1);
	64	if nargin < 2,
	65	om = zeros(3,1);
	66	if nargin < 1,
	67	error('Need at least a 3D structure to project (in project_points.m)');
	68	return;
	69	end;
	70	end;
	71	end;
	72	end;
	73	end;
	74	end;
	75	end;
	76
	77
	78	[m,n] = size(X);
	79
	80	if nargout > 1,
	81	[Y,dYdom,dYdT] = rigid_motion(X,om,T);
	82	else
	83	Y = rigid_motion(X,om,T);
	84	end;
	85
	86
	87	inv_Z = 1./Y(3,:);
	88
	89	x = (Y(1:2,:) .* (ones(2,1) * inv_Z)) ;
	90
	91
	92	bb = (-x(1,:) .* inv_Z)'*ones(1,3);
	93	cc = (-x(2,:) .* inv_Z)'*ones(1,3);
	94
	95	if nargout > 1,
	96	dxdom = zeros(2*n,3);
	97	dxdom(1:2:end,:) = ((inv_Z')ones(1,3)) . dYdom(1:3:end,:) + bb .* dYdom(3:3:end,:);
	98	dxdom(2:2:end,:) = ((inv_Z')ones(1,3)) . dYdom(2:3:end,:) + cc .* dYdom(3:3:end,:);
	99
	100	dxdT = zeros(2*n,3);
	101	dxdT(1:2:end,:) = ((inv_Z')ones(1,3)) . dYdT(1:3:end,:) + bb .* dYdT(3:3:end,:);
	102	dxdT(2:2:end,:) = ((inv_Z')ones(1,3)) . dYdT(2:3:end,:) + cc .* dYdT(3:3:end,:);
	103	end;
	104
	105
	106	% Add distortion:
	107
	108	r2 = x(1,:).^2 + x(2,:).^2;
	109
	110	if nargout > 1,
	111	dr2dom = 2((x(1,:)')ones(1,3)) .* dxdom(1:2:end,:) + 2((x(2,:)')ones(1,3)) .* dxdom(2:2:end,:);
	112	dr2dT = 2((x(1,:)')ones(1,3)) .* dxdT(1:2:end,:) + 2((x(2,:)')ones(1,3)) .* dxdT(2:2:end,:);
	113	end;
	114
	115
	116	r4 = r2.^2;
	117
	118	if nargout > 1,
	119	dr4dom = 2((r2')ones(1,3)) .* dr2dom;
	120	dr4dT = 2((r2')ones(1,3)) .* dr2dT;
	121	end
	122
	123	r6 = r2.^3;
	124
	125	if nargout > 1,
	126	dr6dom = 3((r2'.^2)ones(1,3)) .* dr2dom;
	127	dr6dT = 3((r2'.^2)ones(1,3)) .* dr2dT;
	128	end;
	129
	130	% Radial distortion:
	131
	132	cdist = 1 + k(1) * r2 + k(2) * r4 + k(5) * r6;
	133
	134	if nargout > 1,
	135	dcdistdom = k(1) * dr2dom + k(2) * dr4dom + k(5) * dr6dom;
	136	dcdistdT = k(1) * dr2dT + k(2) * dr4dT + k(5) * dr6dT;
	137	dcdistdk = [ r2' r4' zeros(n,2) r6'];
	138	end;
	139
	140	xd1 = x .* (ones(2,1)*cdist);
	141
	142	if nargout > 1,
	143	dxd1dom = zeros(2*n,3);
	144	dxd1dom(1:2:end,:) = (x(1,:)'ones(1,3)) . dcdistdom;
	145	dxd1dom(2:2:end,:) = (x(2,:)'ones(1,3)) . dcdistdom;
	146	coeff = (reshape([cdist;cdist],2n,1)ones(1,3));
	147	dxd1dom = dxd1dom + coeff.* dxdom;
	148
	149	dxd1dT = zeros(2*n,3);
	150	dxd1dT(1:2:end,:) = (x(1,:)'ones(1,3)) . dcdistdT;
	151	dxd1dT(2:2:end,:) = (x(2,:)'ones(1,3)) . dcdistdT;
	152	dxd1dT = dxd1dT + coeff.* dxdT;
	153
	154	dxd1dk = zeros(2*n,5);
	155	dxd1dk(1:2:end,:) = (x(1,:)'ones(1,5)) . dcdistdk;
	156	dxd1dk(2:2:end,:) = (x(2,:)'ones(1,5)) . dcdistdk;
	157	end;
	158
	159
	160	% tangential distortion:
	161
	162	a1 = 2.x(1,:).x(2,:);
	163	a2 = r2 + 2*x(1,:).^2;
	164	a3 = r2 + 2*x(2,:).^2;
	165
	166	delta_x = [k(3)a1 + k(4)a2 ;
	167	k(3) * a3 + k(4)*a1];
	168
	169
	170	%ddelta_xdx = zeros(2n,2n);
	171	aa = (2k(3)x(2,:)+6k(4)x(1,:))'*ones(1,3);
	172	bb = (2k(3)x(1,:)+2k(4)x(2,:))'*ones(1,3);
	173	cc = (6k(3)x(2,:)+2k(4)x(1,:))'*ones(1,3);
	174
	175	if nargout > 1,
	176	ddelta_xdom = zeros(2*n,3);
	177	ddelta_xdom(1:2:end,:) = aa .* dxdom(1:2:end,:) + bb .* dxdom(2:2:end,:);
	178	ddelta_xdom(2:2:end,:) = bb .* dxdom(1:2:end,:) + cc .* dxdom(2:2:end,:);
	179
	180	ddelta_xdT = zeros(2*n,3);
	181	ddelta_xdT(1:2:end,:) = aa .* dxdT(1:2:end,:) + bb .* dxdT(2:2:end,:);
	182	ddelta_xdT(2:2:end,:) = bb .* dxdT(1:2:end,:) + cc .* dxdT(2:2:end,:);
	183
	184	ddelta_xdk = zeros(2*n,5);
	185	ddelta_xdk(1:2:end,3) = a1';
	186	ddelta_xdk(1:2:end,4) = a2';
	187	ddelta_xdk(2:2:end,3) = a3';
	188	ddelta_xdk(2:2:end,4) = a1';
	189	end;
	190
	191
	192	xd2 = xd1 + delta_x;
	193
	194	if nargout > 1,
	195	dxd2dom = dxd1dom + ddelta_xdom ;
	196	dxd2dT = dxd1dT + ddelta_xdT;
	197	dxd2dk = dxd1dk + ddelta_xdk ;
	198	end;
	199
	200
	201	% Add Skew:
	202
	203	xd3 = [xd2(1,:) + alpha*xd2(2,:);xd2(2,:)];
	204
	205	% Compute: dxd3dom, dxd3dT, dxd3dk, dxd3dalpha
	206	if nargout > 1,
	207	dxd3dom = zeros(2*n,3);
	208	dxd3dom(1:2:2n,:) = dxd2dom(1:2:2n,:) + alphadxd2dom(2:2:2n,:);
	209	dxd3dom(2:2:2n,:) = dxd2dom(2:2:2n,:);
	210	dxd3dT = zeros(2*n,3);
	211	dxd3dT(1:2:2n,:) = dxd2dT(1:2:2n,:) + alphadxd2dT(2:2:2n,:);
	212	dxd3dT(2:2:2n,:) = dxd2dT(2:2:2n,:);
	213	dxd3dk = zeros(2*n,5);
	214	dxd3dk(1:2:2n,:) = dxd2dk(1:2:2n,:) + alphadxd2dk(2:2:2n,:);
	215	dxd3dk(2:2:2n,:) = dxd2dk(2:2:2n,:);
	216	dxd3dalpha = zeros(2*n,1);
	217	dxd3dalpha(1:2:2*n,:) = xd2(2,:)';
	218	end;
	219
	220
	221
	222	% Pixel coordinates:
	223	if length(f)>1,
	224	xp = xd3 .* (f * ones(1,n)) + c*ones(1,n);
	225	if nargout > 1,
	226	coeff = reshape(fones(1,n),2n,1);
	227	dxpdom = (coeffones(1,3)) . dxd3dom;
	228	dxpdT = (coeffones(1,3)) . dxd3dT;
	229	dxpdk = (coeffones(1,5)) . dxd3dk;
	230	dxpdalpha = (coeff) .* dxd3dalpha;
	231	dxpdf = zeros(2*n,2);
	232	dxpdf(1:2:end,1) = xd3(1,:)';
	233	dxpdf(2:2:end,2) = xd3(2,:)';
	234	end;
	235	else
	236	xp = f * xd3 + c*ones(1,n);
	237	if nargout > 1,
	238	dxpdom = f * dxd3dom;
	239	dxpdT = f * dxd3dT;
	240	dxpdk = f * dxd3dk;
	241	dxpdalpha = f .* dxd3dalpha;
	242	dxpdf = xd3(:);
	243	end;
	244	end;
	245
	246	if nargout > 1,
	247	dxpdc = zeros(2*n,2);
	248	dxpdc(1:2:end,1) = ones(n,1);
	249	dxpdc(2:2:end,2) = ones(n,1);
	250	end;
	251
	252
	253	return;
	254
	255	% Test of the Jacobians:
	256
	257	n = 10;
	258
	259	X = 10*randn(3,n);
	260	om = randn(3,1);
	261	T = [10*randn(2,1);40];
	262	f = 1000*rand(2,1);
	263	c = 1000*randn(2,1);
	264	k = 0.5*randn(5,1);
	265	alpha = 0.01*randn(1,1);
	266
	267	[x,dxdom,dxdT,dxdf,dxdc,dxdk,dxdalpha] = project_points2(X,om,T,f,c,k,alpha);
	268
	269
	270	% Test on om: OK
	271
	272	dom = 0.000000001 * norm(om)*randn(3,1);
	273	om2 = om + dom;
	274
	275	[x2] = project_points2(X,om2,T,f,c,k,alpha);
	276
	277	x_pred = x + reshape(dxdom * dom,2,n);
	278
	279
	280	norm(x2-x)/norm(x2 - x_pred)
	281
	282
	283	% Test on T: OK!!
	284
	285	dT = 0.0001 * norm(T)*randn(3,1);
	286	T2 = T + dT;
	287
	288	[x2] = project_points2(X,om,T2,f,c,k,alpha);
	289
	290	x_pred = x + reshape(dxdT * dT,2,n);
	291
	292
	293	norm(x2-x)/norm(x2 - x_pred)
	294
	295
	296
	297	% Test on f: OK!!
	298
	299	df = 0.001 * norm(f)*randn(2,1);
	300	f2 = f + df;
	301
	302	[x2] = project_points2(X,om,T,f2,c,k,alpha);
	303
	304	x_pred = x + reshape(dxdf * df,2,n);
	305
	306
	307	norm(x2-x)/norm(x2 - x_pred)
	308
	309
	310	% Test on c: OK!!
	311
	312	dc = 0.01 * norm(c)*randn(2,1);
	313	c2 = c + dc;
	314
	315	[x2] = project_points2(X,om,T,f,c2,k,alpha);
	316
	317	x_pred = x + reshape(dxdc * dc,2,n);
	318
	319	norm(x2-x)/norm(x2 - x_pred)
	320
	321	% Test on k: OK!!
	322
	323	dk = 0.001 * norm(k)*randn(5,1);
	324	k2 = k + dk;
	325
	326	[x2] = project_points2(X,om,T,f,c,k2,alpha);
	327
	328	x_pred = x + reshape(dxdk * dk,2,n);
	329
	330	norm(x2-x)/norm(x2 - x_pred)
	331
	332
	333	% Test on alpha: OK!!
	334
	335	dalpha = 0.001 * norm(k)*randn(1,1);
	336	alpha2 = alpha + dalpha;
	337
	338	[x2] = project_points2(X,om,T,f,c,k,alpha2);
	339
	340	x_pred = x + reshape(dxdalpha * dalpha,2,n);
	341
	342	norm(x2-x)/norm(x2 - x_pred)

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