**Statement of Problem:**

I have an array

`M`

with`m`

rows and`n`

columns. The array`M`

is filled with non-zero elements.I also have a vector

`t`

with`n`

elements, and a vector`omega`

with`m`

elements.The elements of

`t`

correspond to the columns of matrix`M`

.The elements of

`omega`

correspond to the rows of matrix`M`

.

**Goal of Algorithm:**

Define `chi`

as the multiplication of vector `t`

and `omega`

. *I need to obtain a 1D vector a, where each element of a is a function of chi.*

Each element of `chi`

is unique (i.e. every element is different).

Using mathematics notation, this can be expressed as `a(chi)`

Each element of vector `a`

corresponds to an element or elements of `M`

.

**Matlab code:**

Here is a code snippet showing how the vectors `t`

and `omega`

are generated. The matrix `M`

is pre-existing.

```
[m,n] = size(M);
t = linspace(0,5,n);
omega = linspace(0,628,m);
```

**Conceptual Diagram:**

**This appears to be a type of integration (if this is the right word for it) along constant chi.**

**Reference:**

The algorithm is not explicitly stated in the reference. I only wish that this algorithm was described in a manner reminiscent of computer science textbooks!

Looking at Figure 11.5, the matrix M is Figure 11.5(a). The goal is to find an algorithm to convert Figure 11.5(a) into 11.5(b).

It appears that the algorithm is a type of integration (averaging, perhaps?) along constant `chi`

.