Pseudo-random distribution of points with minimum distance

23 visualizzazioni (ultimi 30 giorni)
Florian
Florian il 28 Mar 2019
Modificato: Bruno Luong il 20 Mag 2021
Hi all,
I use the following code to generate an exact number of points (650 in this case) within a one hectar area:
numPoints = 650; % number of points to be generated
width = 100; % length in m of one square side
x = 0;
y = 0;
figure('Position', [300 300 900 900])
rectangle('Position', [x, y, width, width],'LineWidth',2,'LineStyle','--');
grid on;
hold on;
xRandom = 50 + (width * rand(1, numPoints) - width / 2);
yRandom = 50 + (width * rand(1, numPoints) - width / 2);
plot(xRandom, yRandom, 'b.', 'MarkerSize', 8);
hold on;
plot(xRandom, yRandom, 'ro', 'MarkerSize', 20);
title(['',num2str(numPoints),' points inside one hectar'], 'Interpreter', 'None');
xlabel('length in meters');
ylabel('length in meters');
axis equal tight;
What I would like to achieve is that the minimum distance between these points is 3 meters. This condition is fulfilled if the red circles (with 3 m diameter - only approximated here using MarkerSize) only touch each other but don't overlap as they currently do (see image below).
Does anybody know how to accomplish this?
PS: at a completely regular spacing of 650 points in one hectar there would be 4 m distance between each point. Maybe a possible solution would be to create a regular spacing first and then add or substract a smaller random increment?
  3 Commenti
Mostra 1 commento meno recente
Florian
Florian il 28 Mar 2019
Modificato: Florian il 28 Mar 2019
I need to end up with the exact number, so eliminating offenders (as proposed in previous solutions) is not an option. Maybe 'rand' is not the best function to start with...
James Tursa
James Tursa il 28 Mar 2019
I wasn't suggesting eliminating the offenders, but pushing them away from each other until they are not offending anymore.

Accedi per commentare.

Accedi per rispondere a questa domanda.

Risposta accettata

Torsten
Torsten il 29 Mar 2019
See Bruno Luong's code under
https://de.mathworks.com/matlabcentral/answers/432516-model-of-a-crowd-on-concert-venue-or-how-to-distribute-random-points-according-to-the-2d-window-dist
  6 Commenti
Mostra 4 commenti meno recenti
Bruno Luong
Bruno Luong il 29 Mar 2019
Modificato: Bruno Luong il 26 Set 2019
For reference I put here the code with uniform distribution
L = 100; % <-- Choose length of square sides
x0 = 0; y0 = 0; % <-- Choose center of square
n = 300; % <-- Choose number of points
% Generate uniform-distribution on the square
X = rand(n,2)*L - (L/2*[1,1]+[x0,y0]);
XYR = [x0,y0]+[[-1;1;1;-1;-1],[-1;-1;1;1;-1]]*L/2;
XB = interp1((0:4)'*L,XYR,linspace(0,4*L,200));
XB(end,:) = [];
nrepulsion = 500;
% Repulsion of seeds to avoid them to be too close to each other
n = size(X,1);
Xmin = [x0-L/2,y0-L/2];
Xmax = [x0+L/2,y0+L/2];
% Point on boundary
XR = x0+[-1,1,1,-1,-1]*L/2;
YR = y0+[-1,-1,1,1,-1]*L/2;
cla;
hold on
plot(XR,YR,'r-');
h = plot(X(:,1),X(:,2),'b.');
axis equal
dmin = 3; % minima distance between 2 objects
d2min = dmin*dmin;
beta = 0.5;
for k = 1:nrepulsion
XALL = [X; XB];
DT = delaunayTriangulation(XALL);
T = DT.ConnectivityList;
containX = ismember(T,1:n);
b = any(containX,2);
TX = T(b,:);
[r,i0] = find(containX(b,:));
i = mod(i0+(-1:1),3)+1;
i = TX(r + (i-1)*size(TX,1));
T = accumarray([i(:,1);i(:,1)],[i(:,2);i(:,3)],[n 1],@(x) {x});
maxd2 = 0;
R = zeros(n,2);
move = false(n,1);
for i=1:n
Ti = T{i};
P = X(i,:) - XALL(Ti,:);
nP2 = sum(P.^2,2);
if any(nP2<4*d2min)
move(i) = true;
move(Ti(Ti<=n)) = true;
end
maxd2 = maxd2 + mean(nP2);
b = Ti > n;
nP2(b) = nP2(b)*5; % reduce repulsion from each point of the border
R(i,:) = sum(P./max((nP2-d2min),1e-3),1);
end
if ~any(move)
break
end
if k==1
v0 = (L*5e-3)/sqrt(maxd2/n);
end
R = R(move,:);
v = v0/sqrt(max(sum(R.^2,2)));
X(move,:) = X(move,:) + v*R;
% Project back if points falling outside the rectangle
X = min(max(X,Xmin),Xmax);
set(h,'XData',X(:,1),'YData',X(:,2));
pause(0.01);
end
theta = linspace(0,2*pi,65);
xc = dmin/2*sin(theta);
yc = dmin/2*cos(theta);
% plot circles f diameter dmin around random points
for i=1:n
plot(X(i,1)+xc,X(i,2)+yc,'k');
end

Accedi per commentare.

Più risposte (2)

Image Analyst
Image Analyst il 29 Mar 2019
See my attached demo that I've posted before.
Capture.PNG
  10 Commenti
Mostra 8 commenti meno recenti
Image Analyst
Image Analyst il 19 Mag 2021
With a Gaussian distribution, and a finite number of samples drawn from it, it's certainly possible to not encounter any negative values. For example if the mean were 10 and the SD were 0.5 and you drew 10 thousand samples, it's possible that none of those 10,000 numbers would be negative.
% Get 10 thousand numbers from a Gaussian Distribution
r = 10 + 0.5 * randn(10000, 1);
% Find out what the min and max are
fprintf('Min r = %f\nMax r = %f\n', min(r), max(r));
fprintf('Mean r = %f\nStd Dev r = %f\n', mean(r), std(r));
% Fit data, r, to a Gaussian/Normal distribution
% even though there are no negative numbers.
pd = fitdist(r, 'Normal')
Min r = 7.783199
Max r = 12.011163
Mean r = 10.002350
Std Dev r = 0.497673
pd =
Normal distribution
mu = 10.0011 [9.99139, 10.0108]
sigma = 0.495396 [0.488625, 0.502359]
That said @Jeroen Houwen, looking at my Fry Plot demo below you can see the distribution for distances bounded in a rectangle looks more log normal than normal.
Bruno Luong
Bruno Luong il 20 Mag 2021
Modificato: Bruno Luong il 20 Mag 2021
"With a Gaussian distribution, and a finite number of samples drawn from it, it's certainly possible to not encounter any negative values."
Fine but that has nothing to do my comment, which is one can NEVER generate a Gaussian random distribution with a positive values. I'm not talking about the reverse.

Accedi per commentare.

Image Analyst
Image Analyst il 19 Mag 2021
@Jeroen Houwen, see attached demo of Fry Plot.

Categorie

Scopri di più su Multivariate Normal Distribution in Help Center e File Exchange

Tag

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by