Exercise 4.08Z: Basics about Interleaving

Interleaver description

Interleaving is required, for example, for a channel with burst error characteristics in order to distribute the errors within the burst over a sufficiently large area so that they can subsequently be largely corrected (or at least detected).

For turbo codes based on so-called RSC encoder (Recursive Systematic Convolutional Encoder) – and only such make sense – interleaving is essential also with the AWGN channel, because then there are also always (some) input sequences, which deliver only zeros in the output sequence after quite a few ones, and that to infinity ⇒ there are output sequences with very small Hamming weight.

If the bits of such input sequences are distributed over a wide range in the second coder, the problem can be (largely) eliminated by the interaction of both component decoders in the case of iterative symbol-wise decoding.

A general distinction is made between

Block interleaver and
Random interleaver.

In block interleaving one fills a matrix with $S$ columns and $Z$ rows column by column and reads the matrix row by row. This deterministically scrambles a block of information with $I_{\rm max} = S \cdot Z$ bits.

On the right, two interleavers are indicated and in graphical form by the assignment $I_{\rm Out}(I_{\rm In})$. These quantities represent the "index of the output sequence" and the "index of the input sequence", respectively. It holds:

$$1 \le I_{\rm Out} \le I_{\rm max} \hspace{0.05cm}, \hspace{0.5cm} 1 \le I_{\rm In} \le I_{\rm max} \hspace{0.05cm}. $$

In the subtask (1) it is asked whether this is block interleaving or random interleaving . The latter are discussed in the "theory section" but only very briefly.

Hints:

Die Aufgabe bezieht sich auf das Kapitel "The Basics of Turbo Codes".

But other $\rm LNTww$–books also discuss interleaving, including the book "Examples of Message Systems" with reference to the

Standard Digital Subscriber Line (DSL) ⇒ "Interleaving and Deinterleaving",
2G mobile communication system GSM ⇒ "Components of voice– and data transmission",
3G mobile communication system UMTS ⇒ "Channel Coding",
4G mobile communication system LTE ⇒ "Funktionsweise von SC–FDMA" (in the book "Mobile Communications").

Questions

	Block interleaving,
	Random interleaving.

$Z \ = \ $

$S \ = \ $

	$\underline{u}_{\pi} = (110'100'100'011'111'110'010'001' \text{...}\ )$,
	$\underline{u}_{\pi} = (101'001'000'111'100'101'011'101'\text{...}\ )$.

	$\underline{u} = (1101'0010'0011'1111'1001'0001'\text{...}\ )$,
	$\underline{u} = (1010'0100'0111'1001'0101'1101' \text{...}\ )$.

Solution

4×3 Interleaver Matrix

(1) From the regular structure of the function $I_{\rm Out}(I_{\rm In})$ one can see that it is a block interleaver ⇒ Response 1.

(2) The index "1" is output as the first character. Further applies:

The index 5 is output as the second character ⇒ $\underline{Z = 4}$.
The index 2 is output as the fourth character ⇒ $\underline{S = 3}$.

The upper graph shows for the 4×3 interleaver matrix:

the column by column write (red),
the row by row readout (green).

Interleaving

(3) Correct is the proposed solution 2:

The matrix is written column by column and read row by row.
After 12 bits, the matrix is cleared and the procedure starts over.
The graphic shows that now the solution suggestion 2 is correct.

Zum De–Interleaving

(4) Correct is the proposed solution 1:

In deinterleaving, the matrix is written row by row and read column by column.
The graphic shows that here the solution suggestion 1 is correct.