I am currently trying to code up a function to assign probabilities to a collection of vectors using a histogram count. This is essentially a counting exercise, but requires some finesse to be able to achieve efficiently. I will illustrate with an example:
Say that I have a matrix
X = [x1, x2....xM] with
N rows and
M columns. Here,
X represents a collection of
N-dimensional vectors. IN other words, each of the columns of
X is an
As an example, we can generate such an
M = 10000 vectors and
N = 5 dimensions using:
X = randint(5,10000)
This will produce a 5 x 10000 matrix of 0s and 1s, where each column is represents a 5 dimensional vector of 1s and 0s.
I would like to assign a probability to each of these vectors through a basic histogram count. The steps are simple: first find the unique columns of
X; second, count the number of times each unique column occurs. The probability of a particular occurrence is then the #of times this column was in X / total number of columns in
Returning to the example above, I can do the first step using the
unique function in MATLAB as follows:
UniqueXs = unique(X','rows')'
The code above will return
UniqueXs, a matrix with
N rows that only contains the unique columns of X. Note that the transposes are due to weird MATLAB input requirements.
However, I am unable to find a good way to count the number of times each of the columns in UniqueX is in X. So I'm wondering if anyone has any suggestions?
Broadly speaking, I can think of two ways of achieving the counting step. The first way would be to use the
find function, though I think this may be slow since
find is an elementwise operation. The second way would be to call
unique recursively as it can also provide the index of one of the unique columns in
X. This should allow us to remove that column from
X and redo
unique on the resulting
X and keep counting.
Ideally, I think that
unique might already be doing some counting so the most efficient way would probably be to work without the built-in functions.