I want to implement Discrete Integration with Galois Fields in Matlab where the time step is not constant. Assume that it is this:

## My attempt

```
function [ int ] = integrate_matlab( YDataVector, a, b )
%integrate_matlab Calculate the discrete integral
% Discrete Matlab Integration
% int_1^N x(t_k) * (b-a)/N, where t_k = a + (b-a) k/N
%
% YDataVector - Galois vector (255 x 1 gf), this is signal,
% which values you can reach by YDataVector.x
%
% int - returns Galois vector (255 x 1 gf)
N = length(YDataVector);
for k=1:N
tk = a + (b - a) * k/N;
int = xtk(YDataVector, k) * (b - a) / N;
% How to implement the function xtk(YDataVector)?
end
```

and then the function xtk

```
function [ xtk_result ] = xtk( YDataVector, k )
%xkt Summary of this function goes here
% YDataVector - Galois vector (255 x 1 gf), this is signal
% xtk_result - Galois vector (255 x 1 gf)
% k - index, this must be here to be able calculate different xtk for different iterations
xtk_result = ; // I do not know what to fill here
end
```

I am confused by the mathematical series equation **x(tk)** for **tk**.
I know that I am doing now this wrong.
The writing **x(tk)** just confuses me, since I think it as a function that takes in the series.
I know that it is a signal at some time point, here the **YDataVector**, but how to implement it I have forgotten.
I should probably iterate the series first:

```
t_0 = a;
t_1 = a + (b - a) * 1/N;
```

This does not seem to help, since **tk** is not defined iteratively.

**What am I thinking wrong when implementing the series x(tk)?**