# How to group rows with same column values?

Given the matrix with coordinates in 3D space and values for two variables (say a and b) in two matrices I would like to merge rows for same points into a common matrix.

To clearly explain the matter, let's say we have matrices

``````A=[posX, posY, posZ, a]
and
B=[posX, posY, posZ, b]
``````

and would like to combine them into

AB = [posX, posY, posZ, a, b]

for example

``````A = [0 0 1 1; 0 1 0 4; 5 0 12 8];
B = [0 0 0 5; 0 1 0 3; 5 11 7 7];
``````

would give

``````AB = [0 0 0 0 5; 0 0 1 1 0; 0 1 0 4 3; 5 0 12 8 0; 5 11 7 0 7];
``````

In order to do that I first created

ATemp = [A, zeros(length(A,0)] and BTemp = [B(:, [1 2 3]), zeros(length(B),1), B(:,4)]

and then tried to use functions accumarray and grpstats but haven't managed to form the AB matrix.

I would be very thankful if anyone suggested the way to get the desired matrix.

Thanks!

-

``````AB=union(A(:,1:3),B(:,1:3),'rows');
AB(ismember(AB,A(:,1:3),'rows'),4)=A(:,4);
AB(ismember(AB(:,1:3),B(:,1:3),'rows'),5)=B(:,4)
``````

 This solution is only valid if each (x,y,z)-point occurs only once in each matrix. If there are several, there is a dimension mismatch in the second line (and/or the third).

-
don't you need to get rid of the duplicate rows in AB after the first line? –  Dan Feb 20 '13 at 12:50
@Dan "UNION(A,B,'rows') [...] returns the combined rows from the two matrices with no repetitions" says my MATLAB help. Besides, I checked that my `AB` equals his `AB`, so there apparently was no duplicate for the one element in both `A` and `B`. –  arne.b Feb 20 '13 at 12:51
unique(union(A(:,1:3),B(:,1:3),'rows');, 'rows'); will fix the problem you highlight in in your edit? –  Dan Feb 20 '13 at 13:00
@Dan The result of `union` is already unique. To allow repeated coordinates, the problem definition has to be "fixed" first: Which matching row of `A` should be picked for the one in `AB`? Or if there are several in `A` and `B`, which one should be matched with which? –  arne.b Feb 20 '13 at 13:47
I see, you are right. –  Dan Feb 20 '13 at 13:57