Both `convolve`

and `fft`

are *circular*. The first element of convolution must be the dot product of these two series. The results you obtain are correct in this sense.

To perform a linear convolution use:

```
convolve(h2$xt,x2$xt,type="open")
```

Circular convolution is also applied in this case but a required amount of zeros are padded to inputs to achieve linear convolution.

I believe there is not a direct way to achieve linear convolution with `fft`

in R. However this doesn't really matter beacuse `convolve`

itself uses the FFT approach you posted.

## Circular Convolution

A discrete signal **x** is periodic if there is a period **N** such that **x[n] = x[n+N]** for all **n**. Such signals can be represented by **N** samples from **x[0]** to **x[N-1]**.

```
... x[-2] x[-1] x[0] x[1] x[2] ... x[N-2] x[N-1] x[N] x[N+1] ...
^ this part is sufficient ^
```

A regular definition of *convolution* between aperiodic **x** and **y** is defined as:

```
(x * y)[n] = sum{k in [-inf, inf]}(x[k]y[n-k])
```

However, for periodic signals, this formula does not produce finite results. To overcome this problem we define the *circular convolution* between periodic **x** and **y**.

```
(x * y)[n] = sum{k in [0, N-1]}(x[i]y[n-k])
```

When these two signals are represented with **N** values only, we can use **y[n-k+N]** in place of **y[n-k]** for negative values of **n-k**.

The cool thing with circular convolution is that it can calculate the *linear convolution* between box signals, which are discrete signals that have a finite number of non-zero elements.

Box signals of length **N** can be fed to circular convolution with **2N** periodicity, **N** for original samples and **N** zeros padded at the end. The result will be a circular convolution with **2N** samples with **2N-1** for linear convolution and an extra zero.

Circular convolution is generally faster than a direct linear convolution implementation, because it can utilize the *Fast Fourier Transform*, a fast algorithm to calculate the *Discrete Fourier Transform*, which is only defined for periodic discrete signals.

Please see:

Also see: