# Create random unit vector inside a defined conical region

I'm looking for a simple way for creating a random unit vector constrained by a conical region. The origin is always the [0,0,0].

My solution up to now:

function v = GetRandomVectorInsideCone(coneDir,coneAngleDegree)

coneDir = normc(coneDir);

ang = coneAngleDegree + 1;
while ang > coneAngleDegree
v = [randn(1); randn(1); randn(1)];
v = v + coneDir;
v = normc(v);
ang = atan2(norm(cross(v,coneDir)), dot(v,coneDir))*180/pi;
end

My code loops until the random generated unit vector is inside the defined cone. Is there a better way to do that?

Resultant image from test code bellow

Resultant frequency distribution using Ahmed Fasih code (in comments). I wonder how to get a rectangular or normal distribution.

c = [1;1;1]; angs = arrayfun(@(i) subspace(c, GetRandomVectorInsideCone(c, 30)), 1:1e5) * 180/pi; figure(); hist(angs, 50);

Testing code:

clearvars; clc; close all;

coneDir = [randn(1); randn(1); randn(1)];
coneDir = [0 0 1]';
coneDir = normc(coneDir);
coneAngle = 45;
N = 1000;
vAngles = zeros(N,1);
vs = zeros(3,N);
for i=1:N
vs(:,i) = GetRandomVectorInsideCone(coneDir,coneAngle);
vAngles(i) = subspace(vs(:,i),coneDir)*180/pi;
end
maxAngle = max(vAngles);
minAngle = min(vAngles);
meanAngle = mean(vAngles);
AngleStd = std(vAngles);

fprintf('v angle\n');
fprintf('Direction: [%.3f %.3f %.3f]^T. Angle: %.2fº\n',coneDir,coneAngle);
fprintf('Min: %.2fº. Max: %.2fº\n',minAngle,maxAngle);
fprintf('Mean: %.2fº\n',meanAngle);
fprintf('Standard Dev: %.2fº\n',AngleStd);

%% Plot
figure;
grid on;
rotate3d on;
axis equal;
axis vis3d;
axis tight;
hold on;
xlabel('X'); ylabel('Y'); zlabel('Z');

% Plot all vectors
p1 = [0 0 0]';
for i=1:N
p2 = vs(:,i);
plot3ex(p1,p2);
end

% Trying to plot the limiting cone, but no success here :(
% k = [0 1];
% [X,Y,Z] = cylinder([0 1 0]');
% testsubject = surf(X,Y,Z);
% set(testsubject,'FaceAlpha',0.5)

% N = 50;
% r = linspace(0, 1, N);
% [X,Y,Z] = cylinder(r, N);
%
% h = surf(X, Y, Z);
%
% rotate(h, [1 1 0], 90);

plot3ex.m:

function p = plot3ex(varargin)

% Plots a line from each p1 to each p2.
% Inputs:
%   p1 3xN
%   p2 3xN
%   args plot3 configuration string
%   NOTE: p1 and p2 number of points can range from 1 to N
%   but if the number of points are different, one must be 1!
% PVB 2016

p1 = varargin{1};
p2 = varargin{2};
extraArgs = varargin(3:end);

N1 = size(p1,2);
N2 = size(p2,2);
N = N1;

if N1 == 1 && N2 > 1
N = N2;
elseif N1 > 1 && N2 == 1
N = N1
elseif N1 ~= N2
error('if size(p1,2) ~= size(p1,2): size(p1,2) and/or size(p1,2) must be 1 !');
end

for i=1:N
i1 = i;
i2 = i;

if i > N1
i1 = N1;
end
if i > N2
i2 = N2;
end

x = [p1(1,i1) p2(1,i2)];
y = [p1(2,i1) p2(2,i2)];
z = [p1(3,i1) p2(3,i2)];
p = plot3(x,y,z,extraArgs{:});
end
• The code you give is not really illustrating your question. So let me know if I state your problem right: You have a defined conical region (known: origin, direction and departure angle), and you want to generate a random vector (same origin) with its direction included in the conical domain ? – Hoki Aug 17 '16 at 13:17
• Yes, exactly. I've updated the code sample. – Pedro77 Aug 17 '16 at 13:32
• Are there any requirements on the distribution of cosine-angles? I might think the angles should be uniform, but your code produces vectors whose angles with respect to coneDir are very skewed. – Ahmed Fasih Aug 17 '16 at 14:43
• Can you update the question describing what statistical properties you’d like the result to have? There’s lots of choices, the problem is very interesting. – Ahmed Fasih Aug 17 '16 at 15:41
• If you want a normal or a uniform distribution of the resulting angles, use this as your starting point. Generate n random numbers representing your angles (according to the distribution you want). Each number (angle) will define a circle around your cone centerline. Then on each circle generate a random point (or more but then use the same number of points for each circle). All the points obtained will be your vectors (with origin 0), and your distribution should be respected. – Hoki Aug 17 '16 at 17:43

Here’s the solution. It’s based on the wonderful answer at https://math.stackexchange.com/a/205589/81266. I found this answer by googling “random points on spherical cap”, after I learned on Mathworld that a spherical cap is this cut of a 3-sphere with a plane.

Here’s the function:

function r = randSphericalCap(coneAngleDegree, coneDir, N, RNG)

if ~exist('coneDir', 'var') || isempty(coneDir)
coneDir = [0;0;1];
end

if ~exist('N', 'var') || isempty(N)
N = 1;
end

if ~exist('RNG', 'var') || isempty(RNG)
RNG = RandStream.getGlobalStream();
end

coneAngle = coneAngleDegree * pi/180;

% Generate points on the spherical cap around the north pole [1].
% [1] See https://math.stackexchange.com/a/205589/81266
z = RNG.rand(1, N) * (1 - cos(coneAngle)) + cos(coneAngle);
phi = RNG.rand(1, N) * 2 * pi;
x = sqrt(1-z.^2).*cos(phi);
y = sqrt(1-z.^2).*sin(phi);

% If the spherical cap is centered around the north pole, we're done.
if all(coneDir(:) == [0;0;1])
r = [x; y; z];
return;
end

% Find the rotation axis `u` and rotation angle `rot` [1]
u = normc(cross([0;0;1], normc(coneDir)));
rot = acos(dot(normc(coneDir), [0;0;1]));

% Convert rotation axis and angle to 3x3 rotation matrix [2]
% [2] See https://en.wikipedia.org/wiki/Rotation_matrix#Rotation_matrix_from_axis_and_angle
crossMatrix = @(x,y,z) [0 -z y; z 0 -x; -y x 0];
R = cos(rot) * eye(3) + sin(rot) * crossMatrix(u(1), u(2), u(3)) + (1-cos(rot))*(u * u');

% Rotate [x; y; z] from north pole to `coneDir`.
r = R * [x; y; z];

end

function y = normc(x)
y = bsxfun(@rdivide, x, sqrt(sum(x.^2)));
end

This code just implements joriki’s answer on math.stackexchange, filling in all the details that joriki omitted.

Here’s a script that shows how to use it.

clearvars

coneDir = [1;1;1];
coneAngleDegree = 30;
N = 1e4;

sol = randSphericalCap(coneAngleDegree, coneDir, N);
figure;plot3(sol(1,:), sol(2,:), sol(3,:), 'b.', 0,0,0,'rx');
grid
xlabel('x'); ylabel('y'); zlabel('z')
legend('random points','origin','location','best')
title('Final random points on spherical cap')

Here is a 3D plot of 10'000 points from the 30° spherical cap centered around the [1; 1; 1] vector:

Here’s 120° spherical cap:

Now, if you look at the histogram of the angles between these random points at the coneDir = [1;1;1], you will see that the distribution is skewed. Here’s the distribution:

Code to generate this:

normc = @(x) bsxfun(@rdivide, x, sqrt(sum(x.^2)));
mysubspace = @(a,b) real(acos(sum(bsxfun(@times, normc(a), normc(b)))));

angs = arrayfun(@(i) mysubspace(coneDir, sol(:,i)), 1:N) * 180/pi;

nBins = 16;
[n, edges] = histcounts(angs, nBins);
centers = diff(edges(1:2))*[0:(length(n)-1)] + mean(edges(1:2));

figure('color','white');
bar(centers, n);
xlabel('Angle (degrees)')
ylabel('Frequency')
title(sprintf('Histogram of angles between coneDir and random points: %d deg', coneAngleDegree))

Well, this makes sense! If you generate points from the 120° spherical cap around coneDir, of course the 1° cap is going to have very few of those samples, whereas the strip between the 10° and 11° caps will have far more points. So what we want to do is normalize the number of points at a given angle by the surface area of the spherical cap at that angle.

Here’s a function that gives us the surface area of the spherical cap with radius R and angle in radians theta (equation 16 on Mathworld’s spherical cap article):

rThetaToH = @(R, theta) R * (1 - cos(theta));
rThetaToS = @(R, theta) 2 * pi * R * rThetaToH(R, theta);

Then, we can normalize the histogram count for each bin (n above) by the difference in surface area of the spherical caps at the bin’s edges:

figure('color','white');
bar(centers, n ./ diff(rThetaToS(1, edges * pi/180)))

The figure:

This tells us “the number of random vectors divided by the surface area of the spherical segment between histogram bin edges”. This is uniform!

(N.B. If you do this normalized histogram for the vectors generated by your original code, using rejection sampling, the same holds: the normalized histogram is uniform. It’s just that rejection sampling is expensive compared to this.)

(N.B. 2: note that the naive way of picking random points on a sphere—by first generating azimuth/elevation angles and then converting these spherical coordinates to Cartesian coordinates—is no good because it bunches points near the poles: Mathworld, example, example 2. One way to pick points on the entire sphere is sampling from the 3D normal distribution: that way you won’t get bunching near poles. So I believe that your original technique is perfectly appropriate, giving you nice, evenly-distributed points on the sphere without any bunching. This algorithm described above also does the “right thing” and should avoid bunching. Carefully evaluate any proposed algorithms to ensure that the bunching-near-poles problem is avoided.)

• Ohh hey! Nice! Thanks a lot! – Pedro77 Aug 17 '16 at 18:38
• Nice. +1 for a good explanation on why generating azimuth/elevation will concentrate points in the poles. – Hoki Aug 17 '16 at 19:02
• Added a bugfix (see history) because originally if you asked coneDir = [0; 0; 1] (the North Pole), the code breaks and returns all NaNs. There may still be numerical issues if coneDir is very close to the North Pole, so just avoid those situations. Code is public domain. – Ahmed Fasih Aug 17 '16 at 20:54
• I don't know why but my code does not result in an uniform distribution like yours. So, I'm using your version. Also, can you comment a bit your code? – Pedro77 Aug 18 '16 at 19:14
• @Pedro77 I made a thing: bl.ocks.org/fasiha/2bbfc20ef882d76e27f17df31950d156 – Ahmed Fasih Aug 21 '16 at 0:31

it is better to use spherical coordinates and convert it to cartesian coordinates:

coneDirtheta = rand(1) * 2 * pi;
coneDirphi = rand(1) * pi;
coneAngle = 45;
N = 1000;
%perfom transformation preventing concentration of points around the pole
rpolar = acos(cos(coneAngle/2*pi/180) + (1-cos(coneAngle/2*pi/180)) * rand(N, 1));
thetapolar = rand(N,1) * 2 * pi;
x0 = rpolar .*  cos(thetapolar);
y0 = rpolar .* sin(thetapolar);

theta = coneDirtheta + x0;
phi = coneDirphi + y0;
r = rand(N, 1);
x = r .* cos(theta) .* sin(phi);
y = r .* sin(theta) .* sin(phi);
z = r .* cos(phi);
scatter3(x,y,z)

if all points should be of length 1 set r = ones(N,1);

Edit: since intersection of cone with sphere forms a circle first we create random points inside a circle with raduis of (45 / 2) in polar coordinates and as @Ahmed Fasih commented to prevent concentration of points near the pole we should first transform this random points, then convert polar to cartesian 2D coordinates to form x0 and y0

we can use x0 and y0 as phi & theta angle of spherical coordinates and add coneDirtheta & coneDirphi as offsets to these coordinates. then convert spherical to cartesian 3D coordinates

• Can you explain your solution? The resulting vectors does not form a cone, it is like a "rectangular cone" constrain region. – Pedro77 Aug 17 '16 at 17:27
• @Pedro77 answer updated to form 'circular cone' I added some explanations. – rahnema1 Aug 17 '16 at 18:10
• I think this solution has the same problem that afflicts trying to generate random points on the sphere by uniformly-generating azimuth and elevation (spherical coordinates’ angles): see the first paragraph of mathworld.wolfram.com/SpherePointPicking.html — if you use this technique, your solutions will bunch up near the poles. – Ahmed Fasih Aug 17 '16 at 18:24
• @Ahmed Fasih Interesting! Thanks , I edited answer . – rahnema1 Aug 17 '16 at 21:49