Matlab: selecting a number 'i' with a probability 'i' in matlab

I am stuck at a problem in matlab. How do I select a number 'i' with a probability 'i' in a matrix. I want to do this in a matrix, where I select a number 'i' from each row, with probability 'i'.

Any help is appreciated

a sample matrix( dont need to select zeros):

``````    w1= .47;
w2= .023;
m1= .06;
m2= .037;
x=rand(1,m1)<=m1;
tolerance= 0.01;

Transition=[m1 w1 0  w1 0  0   0;
0  m1 w1 0  0  0   0;
0  0  m1 w1 0  0   0;
0  0  0  m2 w2 0   0;
0  0  0  0  m2 w1  w1;
0  0  0  0  0  m1  w1
0  0  0  0  0  0   m1];
``````
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what is the meaning of selecting a number i=6 with probability i=6 ? probabilities are bound from 0 to 1 as far as I can tell. Maybe you mean a number `i` with probability `1/i`? –  natan Feb 8 at 5:41
no no, thats not what I mean. see, if 0.06 gets selected from the Transition matrix, its has to be selected with 0,06 probability! that's what i cant figure out. the matrix contains values from 0 to 1 only. –  happyme Feb 8 at 5:42
so all your numbers are bound [0,1]... –  natan Feb 8 at 5:43
yes! I cant figure the code –  happyme Feb 8 at 5:44

First, we could calculate a matrix of cumulative probabilities `Tc` in preparation for a strategy that finds the first column exceeding a random value between 0 and 1.

``````Tc = zeros(size(T));
Tc(:, 1) = T(:, 1);
for k = 2 : size(T, 2)
Tc(:, k) = Tc(:, k - 1) + T(:, k);
end
``````

To now draw numbers from each row, we first draw `p = rand(size(T, 2), 1)` and then find the column for which `p` falls into a bucket of cumulative probability:

``````for k = 1 : size(T, 1)
col = find(T(k, :) > p(k), 1, 'first');
if isempty(col)
fprintf('nothing drawn for row %d\n', k);
else
fprintf('row %d, col %d, p = %f\n', k, col, T(k, col));
end
end
``````

This works because order does not matter. For example, for some p = 0.2, some arbitrary cumulative distribution could increase from 0.65 to 0.85. The probability for `rand` to yield a value in this interval is indeed 0.2. If this is the last non-zero entry of `T`, `rand` will return a value with 0.15 probability for which no number is drawn. In another example, if all entries in `T` are zero, the cumulative distribution will never exceed what can be drawn by `rand`. For a last example, if there are two entries at 0.5, each, the cumulative distribution will exceed what's drawn by `rand` half and half at either column.

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can @s.bandara please explain! the numbers are drawn, yes, but are they drawn with the same probability, I fail to understand! :(\ –  happyme Feb 8 at 6:07
Does the last paragraph clarify this? –  s.bandara Feb 8 at 6:11
yes, I get it now, @s.bandara, i get it now, and the rows in which nothing is drawn because zero is selected, right?? –  happyme Feb 8 at 6:14
Correct. The cumulative distribution never exceeded the result from `rand` in such a case. The extreme case of that where that is guaranteed is when all entries are zero. I added a few more cases to make this more intuitive. See edits. –  s.bandara Feb 8 at 6:17
Let me know if it works. I don't have MATLAB at my hands right now, but will check tomorrow. –  s.bandara Feb 8 at 6:23
show 4 more comments

So let's start with a hint. Say you have only one number `0.06` and you want a vector (= one row in a matrix), that this number is scattered such there is `0.06` probability to pick it. A simple solution will be to start with a vector of a 100 zeros `v=zeros(100,1)` and then put at 6 random location the number `0.06`, i.e.

``````ind=randi(100,1,6);
v(ind)=0.06;
``````

can you think of a way to extend that to more than one number per row?

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thats a smart way to put up, although, can I just randomly select a number from the given matrix? for i=1:7 while(1) sel=randi(7); if((Dij(i,sel) ~= 0)) show(i)=sel; break; end end %Dij(i,sel)=Dij(i,sel)-tolerance*(i ~= sel); NewDij=Dij; end I did this, but it selects a number randomly, not with a probability –  happyme Feb 8 at 5:55