Main diagonal operations problem
古いコメントを表示
Hi guys, I need your help.
I want to create a matrix(4,4) in which the main diagonal have values between 0.3 and 1 and the other cells assume values such as to have a horizontal sum equal to 1.
By now I'm using the following code but the only result is to have a main diagonal composed by the same numbers:
x = eye(4)
x(1,1) = 1+(0.3-1)*rand(1,1)
x(2,2) = x(1,1)
x(3,3) = x(1,1)
x(4,4) = x(1,1)
Any suggestion?
PS : I've tried even with diag
2 件のコメント
"...the other cells assume values such as to have a horizontal sum equal to 1"
Are there any other requirements on the other elements? Positive, negative, fractional values, integer, >1, >100, >1e100 ... what values are allowed?
What is the "horizontal sum": do you mean to sum along the 2nd dimension (i.e. along each row) ?
Giuseppe Pintori
2019 年 9 月 13 日
採用された回答
>> N = 4; % matrix size
>> M = nan(N,N); % preallocate
>> V = 0.3+(1-0.3)*rand(1,1) % diagonal value
V =
0.47505
>> M(~eye(N)) = randfixedsum(N-1,N,1-V,0,1); % other values
>> M = M.'; % transpose
>> M(1:N+1:end) = V % assign diagonal value
M =
0.47505 0.40657 0.0087969 0.10958
0.12917 0.47505 0.21287 0.1829
0.35794 0.15519 0.47505 0.011825
0.41335 0.032696 0.078907 0.47505
Checking the sum of each row:
>> sum(M,2)
ans =
1
1
1
1
and diagonal:
>> diag(M)
ans =
0.47505
0.47505
0.47505
0.47505
6 件のコメント
John D'Errico
2019 年 9 月 13 日
編集済み: John D'Errico
2019 年 9 月 13 日
Interesting. I wonder if your method, using a rejection scheme, and mine, which conditions on the diagonal element, will produce the same distribution in the end? I'm not sure it terribly matters, but it is just a technical question for future reference to me. I'm not sure at the moment, since these things can get tricky.
Giuseppe Pintori
2019 年 9 月 13 日
John D'Errico
2019 年 9 月 13 日
編集済み: John D'Errico
2019 年 9 月 13 日
And the answer after some thought is, yes, the result will be technically different distributions of elements in the array. But I have no clue as to which is more appropriate given the question. Your solution will generate a sample that is uniform within each row in the sample space, so yours may be more appropriate.
Bruno Luong
2019 年 9 月 13 日
編集済み: Bruno Luong
2019 年 9 月 13 日
@John, I have some formula on the distribution for you (you might know it already).
for X, m vectors of R^n as returned by
X = randfixedsum(n,m,1,0,1)
X(:,i) = { x uniform in [0,1]^n such that sum(x) = 1 }, i=1...,m.
the projection of any component #k, x(k,:) is on [0,1] has the pdf that is a polynomial of order (n-2):
P(x) := (n-1)(1-x).^(n-2) = sum_ {k=0,1..., n-2} p_{n,k} x^k;
with p_{n,k} = (n-1)*(-1)^k* nchoosek(n-2,k);
Example:
n=4;
m = 1e6;
X = randfixedsum(n,m,1,0,1);
P=arrayfun(@(k) (n-1)*(-1)^k*nchoosek(n-2,k),n-2:-1:0);
figure()
ax1 = subplot(2,1,1);
ezplot(ax1,@(x) (n-1)*(1-x).^(n-2),[0 1]);
legend(ax1,"PDF n="+n)
ax2 = subplot(2,1,2);
histogram(X(:),100); % by symmetry all components have the same PDF
linkaxes([ax1 ax2],'x');
xlim(ax1,[0 1]);
ylim(ax1,[0 n-1]);
The brutefoce rejection method from Stephen's (before-edited) code implies the diagonal elements follow the PDF of polynomial form of 2nd order 3*(1-x)^2, truncated bellow 0.3.
In your case as you generate the diagonal as uniform, therefore it's certainly different than the distribution from Stephen's method (polynomial).
The PDF formula can be showed recursively on n, without much difficulty technically.
John D'Errico
2019 年 9 月 13 日
編集済み: John D'Errico
2019 年 9 月 13 日
Yes. I had come to that conclusion after some thought too. But there still seems to be the question of what is the true goal, since only Giuseppe can know that. I think Stephen's solution comes closer than mine.
On the other hand, HAD I generated the diagonal elements using a better distribution than uniform, then my solution would be an avenue to not needing to use a rejection while loop at all.
Bruno Luong
2019 年 9 月 13 日
編集済み: Bruno Luong
2019 年 9 月 14 日
Oh I see your point. I think you are right by forcing the right PDF to generate D, it's equivalent to rejection method. This I'm pretty sure it's right because of the special property of simplex and barycentric coordinates.
So the right way (I simplify the procedure to a single row without loosing the generality) is
N = 4;
dmin = 0.3;
dmax = 1;
d = dmax-(dmax-dmin)*rand().^(1/(N-1)); % rather than dmin+(dmax-dmin)*rand;
v = (1-d) * randfixedsum(N-1,1,1,0,1);
then insert d to v....
その他の回答 (3 件)
John D'Errico
2019 年 9 月 13 日
編集済み: John D'Errico
2019 年 9 月 13 日
Easy enough, it seems. First, determine the diagonal elements.
x = diag(rand(1,4)*.7 + .3);
Next, you need to choose the other row elements randomly so the sum will be 1. But that sum will now depend on the diagonal element you just chose. Stilll simple, as long as you use randfixedsum, by Roger Stafford, found on the file exchange.
for i = 1:4
x(i,setdiff(1:4,i)) = randfixedsum(3,1,1 - x(i,i),0,1)';
end
Did it work? Of course.
x
x =
0.83586 0.075979 0.057706 0.030454
0.012356 0.85664 0.11425 0.016757
0.13748 0.21163 0.43081 0.22009
0.15838 0.037488 0.16129 0.64284
>> sum(x,2)
ans =
1
1
1
1
Find randfixedsum here:
Bruno Luong
2019 年 9 月 13 日
編集済み: Bruno Luong
2019 年 9 月 13 日
Here is a method that has two advantages:
- without the need of Roger's FEX randfixedsum
- Produce matrix with rigourous uniform conditional probability
N = 4; % matrix size
% diagonal lo/up bounds
dmin = 0.3;
dmax = 1;
% random (common) diagonal value
d = dmax-(dmax-dmin)*rand().^(1/(N-1)); % Edit see comment above, equiv to rejection method
% d = dmin+(dmax-dmin)*rand;
% Generate N random vectors of length N-1 required sum == (1-d)
V = -log(rand(N-1,N)); % Marsaglia's [1961] method
V = V .* ((1-d)./sum(V,1));
% Arrange in the final matrix
A = zeros(N);
isdiag = sparse(1:N,1:N,true);
A(isdiag) = d;
A(~isdiag) = V(:);
A = A.';
% Check result
disp(A)
sum(A,2)
カテゴリ
ヘルプ センター および File Exchange で Creating and Concatenating Matrices についてさらに検索
製品
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
