## My Questions

- Is there anyway that I can speed up this calculation?
- Is there a better algorithm or implementation that I can be use to calculate the same values?

## Describing the algorithm

I have a complex indexing problem that I'm struggling to solve in an efficient way.

The goal is to calculate the matrix `w_prime`

using values a combination of values from the equally sized matrices `w`

, `dY`

, and `dX`

.

The value of `w_prime(i,j)`

is calculated as `mean( w( indY & indX ) )`

, where `indY`

and `indX`

are the indices of `dY`

and `dX`

that are equal to `i`

and `j`

respectively.

Here's a simple implementation in matlab of an algorithm to compute `w_prime`

:

```
for i = 1:size(w_prime,1)
indY = dY == i;
for j = 1:size(w_prime,2)
indX = dX == j;
w_prime(ind) = mean( w( indY & indX ) );
end
end
```

## Performance Problems

This implementation is sufficient in example case below; however, in my actual use case `w`

, `dY`

, `dX`

are ~`3000x3000`

and `w_prime`

is ~`60X900`

. Meaning that each index calculation is happening on a ~9 million elements. Needless this implementation is too slow to be usable. Additionally I'll need to run this code a few dozen times.

## Example Calculation

If I want to compute `w(1,1)`

- Find the indices of
`dY`

that equal 1, save as`indY`

- Find the indices of
`dX`

that equal 1, save as`indX`

- Find intersection of
`indY`

and`indX`

save as`ind`

- Save the
`mean( w(ind) )`

to`w_prime(1,1)`

## General Problem Description

I have a set points defined by two vectors `X`

, and `T`

, both are 1XN where N is ~3000. Additionally the values of X and T are integers bound by the intervals (1 60) and (1 900) respectively.

The matrices `dX`

and `dT`

, are simply distance matrices, meaning that they contain the pairwise distances between the points. Ie `dx(i,j)`

is equal `abs( x(i) - x(j) )`

.

They are calculated using: `dx = pdist(x);`

The matrix `w`

can be thought of as a weight matrix that describes how much influence one point has on another.

The purpose of calculating `w_prime(a,b)`

is to determine the average weight between the sub-set of points that are separated by `a`

in the `X`

dimension and `b`

in the `T`

dimension.

This can be expressed as follows: