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matRad_siddonRayTracer.m
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matRad_siddonRayTracer.m
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function [alphas,l,rho,d12,ix] = matRad_siddonRayTracer(isocenter, ...
resolution, ...
sourcePoint, ...
targetPoint, ...
cubes)
% siddon ray tracing through 3D cube to calculate the radiological depth
% according to Siddon 1985 Medical Physics
%
% call
% [alphas,l,rho,d12,vis] = matRad_siddonRayTracer(isocenter, ...
% resolution, ...
% sourcePoint, ...
% targetPoint, ...
% cubes)
%
% input
% isocenter: isocenter within cube [voxels]
% resolution: resolution of the cubes [mm/voxel]
% sourcePoint: source point of ray tracing
% targetPoint: target point of ray tracing
% cubes: cell array of cubes for ray tracing (it is possible to pass
% multiple cubes for ray tracing to save computation time)
%
% output (see Siddon 1985 Medical Physics for a detailed description of the
% variales)
% alphas relative distance between start and endpoint for the
% intersections with the cube
% l lengths of intersestions with cubes
% rho densities extracted from cubes
% d12 distance between start and endpoint of ray tracing
% ix indices of hit voxels
%
% References
% [1] http://www.ncbi.nlm.nih.gov/pubmed/4000088
%
% %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
%
% Copyright 2015 the matRad development team.
%
% This file is part of the matRad project. It is subject to the license
% terms in the LICENSE file found in the top-level directory of this
% distribution and at https://github.com/e0404/matRad/LICENSES.txt. No part
% of the matRad project, including this file, may be copied, modified,
% propagated, or distributed except according to the terms contained in the
% LICENSE file.
%
% %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
% Add isocenter to source and target point. Because the algorithm does not
% works with negatives values. This put (resolution.x,resolution.y,resolution.z)
% in the center of first voxel
sourcePoint = sourcePoint + isocenter;
targetPoint = targetPoint + isocenter;
% Save the numbers of planes.
[yNumPlanes, xNumPlanes, zNumPlanes] = size(cubes{1});
xNumPlanes = xNumPlanes + 1;
yNumPlanes = yNumPlanes + 1;
zNumPlanes = zNumPlanes + 1;
% eq 11
% Calculate the distance from source to target point.
d12 = norm(sourcePoint-targetPoint);
% eq 3
% Position of first planes in millimeter. 0.5 because the central position
% of the first voxel is at [resolution.x resolution.y resolution.z]
xPlane_1 = .5*resolution.x;
yPlane_1 = .5*resolution.y;
zPlane_1 = .5*resolution.z;
% Position of last planes in milimiter
xPlane_end = (xNumPlanes - .5)*resolution.x;
yPlane_end = (yNumPlanes - .5)*resolution.y;
zPlane_end = (zNumPlanes - .5)*resolution.z;
% eq 4
% Calculate parametrics values of \alpha_{min} and \alpha_{max} for every
% axis, intersecting the ray with the sides of the CT.
if targetPoint(1) ~= sourcePoint(1)
aX_1 = (xPlane_1 - sourcePoint(1)) / (targetPoint(1) - sourcePoint(1));
aX_end = (xPlane_end - sourcePoint(1)) / (targetPoint(1) - sourcePoint(1));
else
aX_1 = [];
aX_end = [];
end
if targetPoint(2) ~= sourcePoint(2)
aY_1 = (yPlane_1 - sourcePoint(2)) / (targetPoint(2) - sourcePoint(2));
aY_end = (yPlane_end - sourcePoint(2)) / (targetPoint(2) - sourcePoint(2));
else
aY_1 = [];
aY_end = [];
end
if targetPoint(3) ~= sourcePoint(3)
aZ_1 = (zPlane_1 - sourcePoint(3)) / (targetPoint(3) - sourcePoint(3));
aZ_end = (zPlane_end - sourcePoint(3)) / (targetPoint(3) - sourcePoint(3));
else
aZ_1 = [];
aZ_end = [];
end
% eq 5
% Compute the \alpha_{min} and \alpha_{max} in terms of parametric values
% given by equation 4.
alpha_min = max([0 min(aX_1,aX_end) min(aY_1,aY_end) min(aZ_1,aZ_end)]);
alpha_max = min([1 max(aX_1,aX_end) max(aY_1,aY_end) max(aZ_1,aZ_end)]);
% eq 6
% Calculate the range of indeces who gives parametric values for
% intersected planes.
if targetPoint(1) == sourcePoint(1)
i_min = []; i_max = [];
elseif targetPoint(1) > sourcePoint(1)
i_min = xNumPlanes - (xPlane_end - alpha_min * (targetPoint(1) - sourcePoint(1)) - sourcePoint(1))/resolution.x;
i_max = 1 + (sourcePoint(1) + alpha_max * (targetPoint(1) - sourcePoint(1)) - xPlane_1)/resolution.x;
% rounding
i_min = ceil(1/1000*(round(1000*i_min)));
i_max = floor(1/1000*(round(1000*i_max)));
else
i_min = xNumPlanes - (xPlane_end - alpha_max * (targetPoint(1) - sourcePoint(1)) - sourcePoint(1))/resolution.x;
i_max = 1 + (sourcePoint(1) + alpha_min * (targetPoint(1) - sourcePoint(1)) - xPlane_1)/resolution.x;
i_min = ceil(1/1000*(round(1000*i_min)));
i_max = floor(1/1000*(round(1000*i_max)));
end
if targetPoint(2) == sourcePoint(2)
j_min = []; j_max = [];
elseif targetPoint(2) > sourcePoint(2)
j_min = yNumPlanes - (yPlane_end - alpha_min * (targetPoint(2) - sourcePoint(2)) - sourcePoint(2))/resolution.y;
j_max = 1 + (sourcePoint(2) + alpha_max * (targetPoint(2) - sourcePoint(2)) - yPlane_1)/resolution.y;
j_min = ceil(1/1000*(round(1000*j_min)));
j_max = floor(1/1000*(round(1000*j_max)));
else
j_min = yNumPlanes - (yPlane_end - alpha_max * (targetPoint(2) - sourcePoint(2)) - sourcePoint(2))/resolution.y;
j_max = 1 + (sourcePoint(2) + alpha_min * (targetPoint(2) - sourcePoint(2)) - yPlane_1)/resolution.y;
j_min = ceil(1/1000*(round(1000*j_min)));
j_max = floor(1/1000*(round(1000*j_max)));
end
if targetPoint(3) == sourcePoint(3)
k_min = []; k_max = [];
elseif targetPoint(3) >= sourcePoint(3)
k_min = zNumPlanes - (zPlane_end - alpha_min * (targetPoint(3) - sourcePoint(3)) - sourcePoint(3))/resolution.z;
k_max = 1 + (sourcePoint(3) + alpha_max * (targetPoint(3) - sourcePoint(3)) - zPlane_1)/resolution.z;
k_min = ceil(1/1000*(round(1000*k_min)));
k_max = floor(1/1000*(round(1000*k_max)));
else
k_min = zNumPlanes - (zPlane_end - alpha_max * (targetPoint(3) - sourcePoint(3)) - sourcePoint(3))/resolution.z;
k_max = 1 + (sourcePoint(3) + alpha_min * (targetPoint(3) - sourcePoint(3)) - zPlane_1)/resolution.z;
k_min = ceil(1/1000*(round(1000*k_min)));
k_max = floor(1/1000*(round(1000*k_max)));
end
% eq 7
% For the given range of indices, calculate the paremetrics values who
% represents intersections of the ray with the plane.
if i_min ~= i_max
if targetPoint(1) > sourcePoint(1)
alpha_x = (resolution.x*(i_min:1:i_max)-sourcePoint(1)-.5*resolution.x)/(targetPoint(1)-sourcePoint(1));
else
alpha_x = (resolution.x*(i_max:-1:i_min)-sourcePoint(1)-.5*resolution.x)/(targetPoint(1)-sourcePoint(1));
end
else
alpha_x = [];
end
if j_min ~= j_max
if targetPoint(2) > sourcePoint(2)
alpha_y = (resolution.y*(j_min:1:j_max)-sourcePoint(2)-.5*resolution.y)/(targetPoint(2)-sourcePoint(2));
else
alpha_y = (resolution.y*(j_max:-1:j_min)-sourcePoint(2)-.5*resolution.y)/(targetPoint(2)-sourcePoint(2));
end
else
alpha_y = [];
end
if k_min ~= k_max
if targetPoint(3) > sourcePoint(3)
alpha_z = (resolution.z*(k_min:1:k_max)-sourcePoint(3)-.5*resolution.z)/(targetPoint(3)-sourcePoint(3));
else
alpha_z = (resolution.z*(k_max:-1:k_min)-sourcePoint(3)-.5*resolution.z)/(targetPoint(3)-sourcePoint(3));
end
else
alpha_z = [];
end
% eq 8
% Merge parametrics sets.
alphas = unique([alpha_min alpha_x alpha_y alpha_z alpha_max]);
% eq 10
% Calculate the voxel intersection length.
l = d12*diff(alphas);
% eq 13
% Calculate \alpha_{middle}
alphas_mid = .5*(alphas(1:end-1)+alphas(2:end));
% eq 12
% Calculate the voxel indices: first convert to physical coords
i_mm = sourcePoint(1) + alphas_mid*(targetPoint(1) - sourcePoint(1));
j_mm = sourcePoint(2) + alphas_mid*(targetPoint(2) - sourcePoint(2));
k_mm = sourcePoint(3) + alphas_mid*(targetPoint(3) - sourcePoint(3));
% then convert to voxel index
i = round(i_mm/resolution.x);
j = round(j_mm/resolution.y);
k = round(k_mm/resolution.z);
% Handle numerical instabilities at the borders.
i(i<=0) = 1; j(j<=0) = 1; k(k<=0) = 1;
i(i>xNumPlanes-1) = xNumPlanes-1;
j(j>yNumPlanes-1) = yNumPlanes-1;
k(k>zNumPlanes-1) = zNumPlanes-1;
% Convert to linear indices
ix = j + (i-1)*size(cubes{1},1) + (k-1)*size(cubes{1},1)*size(cubes{1},2);
% obtains the values from cubes
rho = cell(numel(cubes),1);
for i = 1:numel(cubes)
rho{i} = cubes{i}(ix);
end