How should I normalize a vector in Matlab where the sum is 1?

I need to normalize a vector of N integers so that:

• Each value is proportional to its original value (the value will be between 0 and 1)
• The sum of all values is =1

For instance:

If I have a vector

``````V = [2,2,1,0]
``````

the normalized vector should should be:

``````V_norm = [0.4,0.4,0.2,0]  % 0.4+0.4+0.2 = 1
``````

I tried with many solutions found in this community and on the web and finally I did it with this code:

``````part = norm(V);
if part > 0
V_norm = V/part;
else % part = 0 --> avoid "divide by 0"
V_norm = part;
end
``````

The problem this works if:

• all elements of array are "0" --> resultant array doesn't change
• only one element of the array is >0 and all other elements are = 0 --> resultant array: the element >0 is 1 and the other 0

but if I have a different case,although the result is proportional,the sum is not 0. For instance:

``````   V = [1,0,1]
V_norm = [0.74,0,0.74]

V = [1,1,1]
V_norm = [0.54,0.54,0.54]
``````

(I'm not sure if the number are correct because I can't use Matlab right now but I'm sure the sum is > 1 )

Ahy hint?

-

... the normalized vector should should be:

`v_norm = [0.4, 0.4, 0.2, 0]; % 0.4+0.4+0.2 = 1`

That depends. What is your norm function?

`norm(x)` in MATLAB returns the standard norm, meaning the sum of the squares of the elements of a normalized vector `x` is 1.

``````v = [1, 1, 1];         %# norm(v) = sqrt(1^2+1^2+1^2) = ~1.7321
v_norm = v / norm(v);  %# v_norm = [0.5574, 0.5574, 0.5574]
``````

`sum(v_norm .^ 2)` indeed yields 1, but `sum(v_norm)` does not, as expected.

I need to normalize a vector of N integers so that each value is proportional to its original value (the value will be between 0 and 1) and the sum of all values is 1.

What do you mean by "normalize"? Does that mean dividing by a value which is a valid mathematical norm function, according to the norm definition?

What do you mean by "proportional"? Does that imply that all elements are multiplied by that same number? If it does, and it's a valid mathematical norm, you cannot guarantee that the sum of the elements will always be 1.
For instance, consider `v = [1, -2]`. Then `sum(v) = -1`.

Or maybe `sum` is the function you're looking for, but it doesn't mathematically qualify as a norm, because a norm is a function that assigns a strictly positive length or size to all vectors in a vector space.
In the example above, `sum(v)` is negative.

Ahy hint?

You can choose either:

1. `sum(x)`, which fulfills both requirements but doesn't qualify as a norm function since it can yield negative values.
2. `norm(x, 1)`, as OleThomsenBuus suggested, which actually calculates `sum(abs(x(:)))`.
It won't fulfill both your requirements unless you restrict your vector space to non-negative vectors.
-

What you need to do is, I believe, normalize using the 1-norm (taxicab norm):

``````v = [2, 2, 1, 0];
v_normed = v / norm(v, 1); % using the 1-norm
``````

Variable `v_normed` should now be `[0.4, 0.4, 0.2, 0.0]`. The 1-norm of `v_normed` will equal 1. You can also sum the vector (similar to the 1-norm, but without applying the absolute function to each value), but the range of that sum will be between -1 to 1 in the general case (if any values in `v` are below 0). You could use `abs` on the resulting sum, but mathematically it will no longer qualify as a norm.

-
+1: Good suggestion, but I don't think that `abs` is needed. –  Eitan T Jun 27 '12 at 11:55
Better? Thanks btw. –  Ole Thomsen Buus Jun 27 '12 at 12:09
Like I stated in my answer, it still doesn't fulfill the OP's two requirements for all vectors, but at least it mathematically qualifies as a norm. –  Eitan T Jun 27 '12 at 12:27

If there are no furhter conditions to your normalization than you gave at the beginning of your question, a possible solution would be

``````V = [3 4 -2];
S = sum(V);
if (S == 0)
% no solution
else
V_norm = V ./ S;
end
sum(V_norm)
``````
-
As a sidenote, `sum(v)` cannot mathematically qualify as a norm because it can yield negative values. –  Eitan T Jun 27 '12 at 12:31
Doesn't fulfill the requirement of all values being between 0 and 1 (considering negative elements). –  Tobold Jun 27 '12 at 12:47
I agree. I shouldn't have been using the "normalization" instead of "norm", as did the OP. I'll edit my answer accordingly. –  Deve Jun 27 '12 at 12:47
there is no need for dot in `./` –  Serg Jun 27 '12 at 16:00
@Serg That's correct. Still I consider it good practice to use `.` whenever applying scalar operators to a vector, because it makes the code unambigous. –  Deve Jun 28 '12 at 6:27