2:53 AM
3:19 AM
@Burak when I run your code, I got matrices that do not satisfy the multiplicative inverse property: For instance,
1.0000 2.4845 1.4793 1.4579 0.8581 0.8080
2.4941 1.0000 1.4822 1.4607 0.8598 0.8095
4.1887 4.1806 1.0000 2.4532 1.4440 1.3596
4.2502 4.2420 2.5258 1.0000 1.4652 1.3796
7.2209 7.2070 4.2913 4.2291 1.0000 2.3438
7.6691 7.6543 4.5576 4.4916 2.6438 1.0000
2.4941 1.0000 1.4822 1.4607 0.8598 0.8095
4.1887 4.1806 1.0000 2.4532 1.4440 1.3596
4.2502 4.2420 2.5258 1.0000 1.4652 1.3796
7.2209 7.2070 4.2913 4.2291 1.0000 2.3438
7.6691 7.6543 4.5576 4.4916 2.6438 1.0000
clear; clc
M = cell(1, 100); % preallocate memory
% matrix contains both x & 1/x
% we need a distribution whose multiplication with its inverse is uniform
pd = makedist('Triangular', 'a', 0, 'b', 1, 'c', 1);
for m=1:100 % 100 random matrices
A = zeros(6); % allocate memory
% 5 random numbers for 6x6 transitive random matrix
a = random(pd, 1, 5);
% choose a or 1/a randomly
c = rand(1, 5) < 0.5;
% put these numbers above the diagonal
for i=1:5
if c(i)
A(i, i+1) = a(i);
else
A(i, i+1) = 1 / a(i);
end
M = cell(1, 100); % preallocate memory
% matrix contains both x & 1/x
% we need a distribution whose multiplication with its inverse is uniform
pd = makedist('Triangular', 'a', 0, 'b', 1, 'c', 1);
for m=1:100 % 100 random matrices
A = zeros(6); % allocate memory
% 5 random numbers for 6x6 transitive random matrix
a = random(pd, 1, 5);
% choose a or 1/a randomly
c = rand(1, 5) < 0.5;
% put these numbers above the diagonal
for i=1:5
if c(i)
A(i, i+1) = a(i);
else
A(i, i+1) = 1 / a(i);
end
7 hours later…
10:58 AM
@user123 I have no idea why you get such a result. Cany you try the following code:
clear; clc
% 5 random numbers for 6x6 transitive random matrix
a = [2 3 4 5 6];
% put these numbers above the diagonal
for i=1:5
A(i, i+1) = a(i);
end
% complete the transitivity going above
for k=flip(1:4)
for i=1:k
A(i, i-k+6) = A(i, i-k+5) * A(i-k+5, i-k+6);
end
end
% lower triangle is multiplicative inverse of upper triangle
for i=2:6
for j=1:i-1
A(i,j) = 1 / A(j,i);
end
end
% diagonals are 1
for i=1:6
A(i,i) = 1;
clear; clc
% 5 random numbers for 6x6 transitive random matrix
a = [2 3 4 5 6];
% put these numbers above the diagonal
for i=1:5
A(i, i+1) = a(i);
end
% complete the transitivity going above
for k=flip(1:4)
for i=1:k
A(i, i-k+6) = A(i, i-k+5) * A(i-k+5, i-k+6);
end
end
% lower triangle is multiplicative inverse of upper triangle
for i=2:6
for j=1:i-1
A(i,j) = 1 / A(j,i);
end
end
% diagonals are 1
for i=1:6
A(i,i) = 1;
4 hours later…
3:24 PM
Yes, this one works fine. I think the code you posted later has something wrong: I mean, for instance, A = A ./ max(A(:)) * 9 * c); % range becomes (0, 9*c)
2 hours later…
5:30 PM
6 hours later…
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