# How to accumulate data-sets?

I have vector with values between `1` and `N > 1`. Some values COULD occur multiple times consecutively. Now I want to have a second row which counts the consecutively entries and remove all those consecutively occuring entries, e.g.:

``````A = [1 2 1 1 3 2 4 4 1 1 1 2]'
``````

``````B = [1 1;
2 1;
1 2;
3 1;
2 1;
4 2;
1 3;
2 1]
``````

(you see, the second column contains the number of consecutively entries! I came across `accumarray()` in MATLAB recently but I can't find any solution with it for this task since it always regards the whole vector and not only consecutively entries.

Any idea?

-

This probably isn't the most readable or elegant way of doing it, but if you have large vectors and speed is an issue, this vectorisation may help...

``````A = [1 2 1 1 3 2 4 4 1 1 1 2];
``````

First I'm going to pad A with a leading and trailing zero to capture the first and final transitions

``````>>  A = [0, A, 0];
``````

The transition locations can be found where the difference between neighbouring values is not equal to zero:

``````>> locations = find(diff(A)~=0);
``````

But because we padded the start of A with a zero, the first transition is nonsensical, so we only take the locations from 2:end. The values in A of these are the value of each segment:

``````>> first_column = A(locations(2:end))

ans =

1     2     1     3     2     4     1     2
``````

That's the first colomn - now to find the count of each number. This can be found from the difference in locations. This is where padding A at both ends becomes important:

``````>> second_column = diff(locations)

ans =

1     1     2     1     1     2     3     1
``````

Finally combining:

``````B = [first_column', second_column']

B =

1     1
2     1
1     2
3     1
2     1
4     2
1     3
2     1
``````

This can all be combined into one less-readable line:

``````>> A = [1 2 1 1 3 2 4 4 1 1 1 2]';
>> B = [A(find(diff([A; 0]) ~= 0)), diff(find(diff([0; A; 0])))]

B =

1     1
2     1
1     2
3     1
2     1
4     2
1     3
2     1
``````
-
This solution is cleverer than mine, nice work! :) –  Lucas Jan 20 '12 at 14:01
You could write the first column even more compact: `A(diff([A;0])~=0)` (if I am not mistaken) –  Lucas Jan 20 '12 at 14:09
Wow looks pretty clever, how u guys always come up with such incredible combinations of matrizes :-) I'll test it out and tell you on monday. Thanks so far! –  bjoern Jan 20 '12 at 14:51
Okay, it works pretty well, accepted :) –  bjoern Jan 23 '12 at 7:26

I don't see another way then looping through the data set, but it is rather straight forward. Maybe this is not the most elegant solution, but as far as I can see, it works fine.

``````function B = accum_data_set(A)
prev = A(1);
count = 1;
B = [];
for i=2:length(A)
if (prev == A(i))
count = count + 1;
else
B = [B;prev count];
count = 1;
end
prev = A(i);
end
B = [B;prev count];
``````

output:

``````>> A = [1 2 1 1 3 2 4 4 1 1 1 2]';
>> B = accum_data_set(A)

B =

1     1
2     1
1     2
3     1
2     1
4     2
1     3
2     1
``````
-