Difference between revisions of "Exercise 2.6Z: PN Generator of Length 3"

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===Fragebogen===
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===Questions===
  
 
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Revision as of 09:43, 21 December 2021

PN generator with  $L = 3$

The adjacent sketch shows a PN generator of length  $L = 3$  with generator polynomial

$$G( D) = D^{\rm 3} + D^{\rm 2} + \rm 1$$

and thus the octal identifier  $(g_3 \ g_2 \ g_1 \ g_0)$ = $(1 \ 1 \ 0 \ 1)_{\rm bin} = (15)_{\rm oct}$.

The corresponding reciprocal polynomial

$$G_{\rm R}(D) = D^{\rm 3}\cdot ( D^{\rm -3} + D^{\rm -2} + 1) = D^{\rm 3} + D^{\rm 1} + \rm 1$$

has the octal identifier  $(1 \ 0 \ 1 \ 1)_{\rm bin} = (13)_{\rm oct}$.

  • At start time, let the three memory cells be preallocated with the binary values  $1$,  $0$  and  $1$ .
  • Both arrangements generate an M sequence.




Hints:


Questions

1

How long is the period length of the configuration  $(15)$?

$P \ = \ $

2

Determine the output sequence  $〈z_ν\rangle$  for the time points  $1$, ... , $P$.  What are the first  $15$  binary values of the output sequence?
Hint:  From left to right, label the cells with  $S_1$,  $S_2$  and  $S_3$.  Output the value  $z_ν$ that is currently  $\nu$  entered into the memory cell  $S_1$  .

$1\ 0 \ 0 \ 1 \ 1 \ 0 \ 1 \ 0 \ 1 \ 1 \ 1 \ 1 \ 0 \ 0 \ 0$ . . .
$1 \ 0 \ 0 \ 1 \ 1 \ 0 \ 0 \ 1 \ 1 \ 0 \ 0 \ 1 \ 1 \ 0 \ 0 $ . . .
$1 \ 1 \ 0 \ 0 \ 1 \ 0 \ 1 \ 1 \ 1 \ 0 \ 0 \ 1 \ 0 \ 1 \ 1$ . . .
$0 \ 0 \ 1 \ 1 \ 1 \ 0 \ 1 \ 0 \ 0 \ 1 \ 1 \ 1 \ 0 \ 1 \ 0 $. . .

3

Which of the following statements are true for each M sequence?

The number of zeros and ones is equal.
In each period there is one more one than zeros.
The maximum number of consecutive ones is  $L$.
The sequence  $1 \ 0 \ 1 \ 0 \ 1 \ 0 $ ...   is not possible.

4

Now consider the reciprocal order  $(13)$.  What are the first  $15$  binary values of the initial sequence with the same initial assignment here?

$0 \ 0 \ 0 \ 1 \ 1 \ 1 \ 1 \ 0 \ 1 \ 0 \ 1 \ 1 \ 0 \ 0 \ 1 $ . . .
$0 \ 0 \ 1 \ 1 \ 1 \ 0 \ 1 \ 0 \ 0 \ 1 \ 1 \ 1 \ 0 \ 1 \ 0 $ . . .
$0 \ 0 \ 1 \ 0 \ 1 \ 1 \ 1 \ 0 \ 0 \ 1 \ 0 \ 1 \ 1 \ 1 \ 0 $ . . .


Solution

PN–generator with octal identifier $15$

(1)  It is an M-sequence with  $L= 3$.  It follows that $P= 2^L - 1 \hspace{0.15cm}\underline{= 7}$.


(2)  We denote the cells from left to right by  $S_1$,  $S_2$  and  $S_3$.  Then holds:

  • $S_2(\nu) = S_1(\nu - 1)$,
  • $S_3(\nu) = S_2(\nu - 1)$,
  • $S_1(\nu) = S_2(\nu - 1) \ {\rm mod } \ S_3(\nu - 1)$.


The result is entered in the first row of the above table (marked in red):

  • At the clock time  $\nu = 7$  results in the same memory usage as at the time  $\nu = 0$.
  • From this follows  $ {P = 7}$  and the sequence is from  $\nu = 1$  corresponding to solution 3 :
$$\langle z_\nu \rangle = 1 \ 1 \ 0 \ 0 \ 1 \ 1 \ 0 \ 0 \ 1 \ 0 \ 1 \ 1 \text{...}$$
  • In contrast, proposal 1 describes the M sequence of the PN generator with length  $L=4$  and identifier  $(31)$   ⇒   period length is  $P= 15$.
  • In proposal 2, the period length  $P= 4$  is too short.
  • Finally, the last proposal would have the desired period length  $P= 7$, but from the modulo 2 addition of  $S_2= 0$  and  $S_3= 1$  $($für  $\nu = 0)$  it necessarily follows at the next time  $(\nu = 1)$  :   $S_1= 1$.   This property is not exhibited by sequence 4.


(3)  Correct are solutions 2, 3, and 4:

  • The maximum number of consecutive ones is  $L$  (namely if there is a one in all  $L$  memory cells).
  • On the other hand, it is not possible that all memory cells are filled with zeros. Therefore, there is always one more than zeros.
  • The period length of the last sequence is  $P = 2$.  On the other hand, for an M-sequence  $P= 2^L - 1.$  For no value of  $L$  is  $P = 2$  possible.


PN–generator with octal identifier  $13$

(4)  In the adjacent table the emergence of the PN–sequence at the reciprocal polynomial  $G_{\rm R}(D)$  is entered. It can be seen that the proposed solution 2 applies:

  • Also for the reciprocal arrangement, the period length  $P = 7$  must hold, so that proposition 1  $($with  $P = 15)$  is eliminated.
  • Proposal 3 is just a version of the initial sequence of  $(15)$ shifted by two clocks.
  • In contrast, in the (correct) second proposal, the inverse of ... $ 1 \ 1 \ 0 \ 1 \ 0 \ 1$ ... – thus the sequence ... $ 1 \ 0 \ 1 \ 0 \ 0 \ 1 \ 1$ ... – are included, albeit with a phase shift.