How to create array of linearly spaced values from starting and ending points

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Christopher Saltonstall
Christopher Saltonstall el 25 de Oct. de 2017
Editada: Ashaq Shah el 8 de En. de 2022
Hello,
I want to create an array (not vector) of linearly space points from a vector of starting and ending points. For example, I want to do the equivalent of,
go = [1;2;3]; %starting point
st = [2;3;4]; %ending points
nGo = length(go); %number of starting points
nPoints = 10; %number of points in each row
for iGo = 1:nGo
A(iGo,:) = linspace(go,st,nPoints); %create array of linearly spaced rows
end
The problem is that the number of start points in on the order of 10000 and it is part of a fitting routine. So, I need the creation of this matrix to be as efficient as possible using minimal loops. Any suggestions?

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Respuesta aceptada

Kelly Kearney
Kelly Kearney el 25 de Oct. de 2017
This method is faster than looping over linspace:
x = linspace(0,1,nPoints);
A2 = go + x.*(st - go);
Here's a timing test for nGo = 10000:
nGo = 10000;
go = randi(100, nGo, 1);
st = go + randi(100, nGo, 1);
nPoints = 10; %number of points in each row
tic
for ii = 1:100
A = nan(nGo, nPoints);
for iGo = 1:nGo
A(iGo,:) = linspace(go(iGo),st(iGo),nPoints); %create array of linearly spaced rows
end
end
t(1) = toc;
tic
for ii = 1:100
x = linspace(0,1,nPoints);
A2 = go + x.*(st - go);
end
t(2) = toc;
fprintf('Method 1: %.4f msec\nMethod 2: %.4f msec\nSpeedup: %.2f x\n', t*10, t(1)/t(2));
On my computer, I get:
Method 1: 9.6675 msec
Method 2: 0.0676 msec
Speedup: 143.07 x
Differences between A and A2 are on order of 1e-16.
  2 comentarios
Walter Roberson
Walter Roberson el 5 de Jul. de 2021
Ran in:
I am not seeing any error when I execute ?
nGo = 10000;
go = randi(100, nGo, 1);
st = go + randi(100, nGo, 1);
nPoints = 10; %number of points in each row
tic
for ii = 1:100
A = nan(nGo, nPoints);
for iGo = 1:nGo
A(iGo,:) = linspace(go(iGo),st(iGo),nPoints); %create array of linearly spaced rows
end
end
t(1) = toc;
tic
for ii = 1:100
x = linspace(0,1,nPoints);
A2 = go + x.*(st - go);
end
t(2) = toc;
fprintf('Method 1: %.4f msec\nMethod 2: %.4f msec\nSpeedup: %.2f x\n', t*10, t(1)/t(2));
Method 1: 9.8034 msec Method 2: 0.1712 msec Speedup: 57.25 x

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Más respuestas (2)

Nathan Hardenberg
Nathan Hardenberg el 5 de Jul. de 2021
Editada: Nathan Hardenberg el 5 de Jul. de 2021
I want to add the same function/functionality for Simulink. Since the given answer does not seem to work with a Simulink Matlab-function I wrote my own code. [The transposing (transpose() or ') in the beginning is nessecary since simulink seems to automatically assume a row vector.]
Since the output vector is of variable size it's important to set the output (y) as variable size an give a maximum size in the Size-field: (See also: https://de.mathworks.com/matlabcentral/answers/654813-how-do-i-resolve-an-error-about-variable-sized-data-in-my-matlab-function-block?s_tid=srchtitle)
Variable names corresponding to post:
go -> start | st -> goal | nPoints -> steps
See Comments for a slightly better Version!!!! Click Here
function y = vec_linspace(start, goal, steps)
start = start';
goal = goal';
x = linspace(0,1,steps);
% difference = (goal - start);
%
% multip = difference'*x;
%
% onesvec = ones(1, steps);
% startvec = start' * onesvec;
%
% y = startvec + multip;
y = start' * ones(1, steps) + (goal - start)'*x;
  2 comentarios
Walter Roberson
Walter Roberson el 5 de Jul. de 2021
Could you confirm that you really want to transpose the original start, and then that you want to transpose again when you use it in calculating y ? Wouldn't you get the same result if you did
function y = vec_linspace(start, goal, steps)
x = linspace(0,1,steps);
% difference = (goal - start);
%
% multip = difference'*x;
%
% onesvec = ones(1, steps);
% startvec = start' * onesvec;
%
% y = startvec + multip;
y = start * ones(1, steps) + (goal - start)*x;
Nathan Hardenberg
Nathan Hardenberg el 5 de Jul. de 2021
Hmm, seems you are right! Your version works as well and is also better (less calculations). While debugging I had a lot of issues with matrix multiplications not working, so i probably did unnecessary transposes.

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Ashaq Shah
Ashaq Shah el 8 de En. de 2022
Editada: Ashaq Shah el 8 de En. de 2022
vector = [startpoint:step:endpoint]

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