Difference between revisions of "Aufgaben:Exercise 4.09: Recursive Systematic Convolutional Codes"

From LNTwww
 
(6 intermediate revisions by the same user not shown)
Line 30: Line 30:
  
  
Hints:
+
<u>Hints:</u>
 
* The exercise refers to the chapter&nbsp; [[Channel_Coding/The_Basics_of_Turbo_Codes|"Basics of Turbo Codes"]].
 
* The exercise refers to the chapter&nbsp; [[Channel_Coding/The_Basics_of_Turbo_Codes|"Basics of Turbo Codes"]].
* Similar exercises can be found in chapters 3.1 through 3.3.
 
 
   
 
   
 
* The following vectorial quantities are used in the questions for this exercise:
 
* The following vectorial quantities are used in the questions for this exercise:
** the information sequence:&nbsp; $\hspace{0.2cm} \underline{u} = (u_1, \, u_2, \text{...} \hspace{0.05cm} )$,
+
 
** the parity-check sequence:&nbsp; $\hspace{0.2cm} \underline{p} = (p_1, \, p_2, \text{...} \hspace{0.05cm})$,
+
:* the information sequence:&nbsp; $\hspace{0.2cm} \underline{u} = (u_1, \, u_2, \text{...} \hspace{0.05cm} )$,
** the impulse response:&nbsp; $\hspace{0.2cm} \underline{g} = (g_1, \, g_2, \text{...} \hspace{0.05cm} ); \hspace{0.2cm}$ this is equal to the parity sequence $\underline{p}$&nbsp; for&nbsp; $\underline{u} = (1, \, 0, \, 0, \text{...} \hspace{0.05cm} )$.
+
:* the parity-check sequence:&nbsp; $\hspace{0.2cm} \underline{p} = (p_1, \, p_2, \text{...} \hspace{0.05cm})$,
 +
:* the impulse response:&nbsp; $\hspace{0.2cm} \underline{g} = (g_1, \, g_2, \text{...} \hspace{0.05cm} ); \hspace{0.2cm}$ this is equal to the parity sequence&nbsp; $\underline{p}$&nbsp; for&nbsp; $\underline{u} = (1, \, 0, \, 0, \text{...} \hspace{0.05cm} )$.
  
  
Line 45: Line 45:
 
{What is the impulse response&nbsp; $\underline{g}$&nbsp;?
 
{What is the impulse response&nbsp; $\underline{g}$&nbsp;?
 
|type="()"}
 
|type="()"}
+&nbsp;  $\underline{g} = (1, \, 1, \, 1, \, 0, \, 1, \, 1, \, 0, \, 1, \, 1, \text{...}  \hspace{0.05cm})$ holds.
+
+&nbsp;  $\underline{g} = (1, \, 1, \, 1, \, 0, \, 1, \, 1, \, 0, \, 1, \, 1, \text{...}  \hspace{0.05cm})$.
-&nbsp;  $\underline{g} = (1, \, 0, \, 1, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \text{...}  \hspace{0.05cm})$ holds.
+
-&nbsp;  $\underline{g} = (1, \, 0, \, 1, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \text{...}  \hspace{0.05cm})$.
  
{It holds&nbsp; $\underline{u} = (1, \, 1, \, 0, \, 1)$. Which statements hold for the parity sequence&nbsp; $\underline{p}$&nbsp;?
+
{It holds &nbsp; $\underline{u} = (1, \, 1, \, 0, \, 1)$.&nbsp; Which statements hold for the parity sequence&nbsp; $\underline{p}$&nbsp;?
 
|type="[]"}
 
|type="[]"}
-&nbsp;  $\underline{p} = (1, \, 0, \, 1, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \text{...}  \hspace{0.05cm})$ holds.
+
-&nbsp;  $\underline{p} = (1, \, 0, \, 1, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \text{...}  \hspace{0.05cm})$.
+&nbsp;  $\underline{p} = (1, \, 0, \, 0, \, 0, \, 0, \, 1, \, 1, \, 0, \, 1, \, 1, \, 0, \, 1, \text{...}  \hspace{0.05cm})$ holds.
+
+&nbsp;  $\underline{p} = (1, \, 0, \, 0, \, 0, \, 0, \, 1, \, 1, \, 0, \, 1, \, 1, \, 0, \, 1, \text{...}  \hspace{0.05cm})$.
- With limited information sequence&nbsp; $\underline{u}$&nbsp; is always also&nbsp; $\underline{p}$&nbsp; limited.
+
- With limited information sequence&nbsp; $\underline{u}$ &nbsp; &rArr; &nbsp; $\underline{p}$&nbsp; is also limited.
  
 
{What is the&nbsp; $D$&ndash;transfer function&nbsp; $G(D)$?
 
{What is the&nbsp; $D$&ndash;transfer function&nbsp; $G(D)$?
 
|type="[]"}
 
|type="[]"}
+&nbsp;  $G(D) = 1 + D + D^2 + D^4 + D^5 + D^7 + D^8 + \text{...}  \hspace{0.05cm}$ holds.
+
+&nbsp;  $G(D) = 1 + D + D^2 + D^4 + D^5 + D^7 + D^8 + \text{...}  \hspace{0.05cm}$.
+&nbsp;  $G(D) = (1 + D^2)/(1 + D + D^2)$ holds.
+
+&nbsp;  $G(D) = (1 + D^2)/(1 + D + D^2)$.
-&nbsp;  $G(D) = (1 + D + D^2)/(1 + D^2)$ holds.
+
-&nbsp;  $G(D) = (1 + D + D^2)/(1 + D^2)$.
  
{Now let&nbsp; $\underline{u} = (1, \, 1, \, 1)$ hold. Which statements hold for the parity sequence&nbsp; $\underline{p}$?
+
{Now let&nbsp; $\underline{u} = (1, \, 1, \, 1)$.&nbsp; Which statements hold for the parity sequence&nbsp; $\underline{p}$?
 
|type="[]"}
 
|type="[]"}
+&nbsp;  $\underline{p} = (1, \, 0, \, 1, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \text{...}  \hspace{0.05cm})$ holds.
+
+&nbsp;  $\underline{p} = (1, \, 0, \, 1, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \text{...}  \hspace{0.05cm})$.
-&nbsp;  $\underline{p} = (1, \, 0, \, 0, \, 0, \, 0, \, 1, \, 1, \, 0, \, 1, \, 1, \, 0, \, 1, \text{...}  \hspace{0.05cm})$ holds.
+
-&nbsp;  $\underline{p} = (1, \, 0, \, 0, \, 0, \, 0, \, 1, \, 1, \, 0, \, 1, \, 1, \, 0, \, 1, \text{...}  \hspace{0.05cm})$.
- With unlimited impulse response&nbsp; $\underline{g}$&nbsp; is always also&nbsp; $\underline{p}$&nbsp; unlimited.
+
- With limited information sequence&nbsp; $\underline{u}$ &nbsp; &rArr; &nbsp; $\underline{p}$&nbsp; is also limited.
  
 
{What is the free distance&nbsp; $d_{\rm F}$&nbsp; of this RSC encoder?
 
{What is the free distance&nbsp; $d_{\rm F}$&nbsp; of this RSC encoder?
Line 73: Line 73:
 
===Solution===
 
===Solution===
 
{{ML-Kopf}}
 
{{ML-Kopf}}
'''(1)'''&nbsp; Tracing the transitions in the state diagram for the sequence&nbsp;  $\underline{u} = (1, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0)$&nbsp;  at the input, we get the path
+
'''(1)'''&nbsp; Tracing the transitions in the state diagram for the sequence &nbsp;  $\underline{u} = (1, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0)$ &nbsp;  at the input,&nbsp; we get the path
 
:$$S_0 &#8594; S_1 &#8594; S_3 &#8594; S_2 &#8594; S_1 &#8594; S_3 &#8594; S_2 &#8594; S_1 &#8594; S_3 &#8594; \hspace{0.05cm}\text{...}  \hspace{0.05cm}$$
 
:$$S_0 &#8594; S_1 &#8594; S_3 &#8594; S_2 &#8594; S_1 &#8594; S_3 &#8594; S_2 &#8594; S_1 &#8594; S_3 &#8594; \hspace{0.05cm}\text{...}  \hspace{0.05cm}$$
  
*For each transition, the first code symbol $x_i^{(1)}$ is equal to the information bit $u_i$ and the code symbol $x_i^{(2)}$ indicates the parity-check bit $p_i$.  
+
*For each transition,&nbsp; the first code symbol&nbsp; $x_i^{(1)}$&nbsp; is equal to the information bit&nbsp; $u_i$&nbsp; and the code symbol&nbsp; $x_i^{(2)}$&nbsp; indicates the parity-check bit&nbsp; $p_i$.
 +
 
*This gives the result corresponding to <u>solution proposition 1</u>:
 
*This gives the result corresponding to <u>solution proposition 1</u>:
 
:$$\underline{p}= (\hspace{0.05cm}1\hspace{0.05cm},
 
:$$\underline{p}= (\hspace{0.05cm}1\hspace{0.05cm},
Line 89: Line 90:
 
= \underline{g}\hspace{0.05cm}.$$
 
= \underline{g}\hspace{0.05cm}.$$
  
*For any RSC code, the impulse response $\underline{g}$ is infinite in length and becomes periodic at some point, in this example with period&nbsp; $P = 3$&nbsp; and&nbsp; "$0, \, 1, \, 1$".
+
*For any RSC code,&nbsp; the impulse response&nbsp; $\underline{g}$&nbsp; is infinite in length and becomes periodic at some point,&nbsp; in this example with period&nbsp; $P = 3$&nbsp; and&nbsp; "$0, \, 1, \, 1$".
  
  
  
[[File:P_ID3054__KC_A_4_9b_v1.png|right|frame|Clarification of&nbsp;  $\underline{p} = (1, \, 1, \, 0, \, 1)^{\rm T} \cdot \mathbf{G}$]]
+
[[File:EN_KC_A_4_9b_v1.png|right|frame|Clarification of&nbsp;  $\underline{p} = (1, \, 1, \, 0, \, 1)^{\rm T} \cdot \mathbf{G}$]]
 
'''(2)'''&nbsp; The graph shows the solution of this exercise according to the equation&nbsp; $\underline{p} = \underline{u}^{\rm T} \cdot \mathbf{G}$.
 
'''(2)'''&nbsp; The graph shows the solution of this exercise according to the equation&nbsp; $\underline{p} = \underline{u}^{\rm T} \cdot \mathbf{G}$.
* Here the generator matrix&nbsp; $\mathbf{G}$&nbsp; is infinitely extended downward and to the right.  
+
* Here the generator matrix&nbsp; $\mathbf{G}$&nbsp; is infinitely extended downward and to the right.
*The correct solution is <u>proposal 2</u>.
+
<br clear=all>
+
*The correct solution is&nbsp; <u>proposal 2</u>.
'''(3)'''&nbsp; Correct are <u>the proposed solutions 1 and 2</u>:
+
 
*Between the impulse response $\underline{g}$ and the $D$&ndash;transfer function $\mathbf{G}(D)$ there is the relation according to the first proposed solution:  
+
 
 +
 
 +
'''(3)'''&nbsp; Correct are&nbsp; <u>the proposed solutions 1 and 2</u>:
 +
*Between the impulse response&nbsp; $\underline{g}$&nbsp; and the&nbsp; $D$&ndash;transfer function&nbsp; $\mathbf{G}(D)$&nbsp; there is the relation according to the first proposed solution:  
 
:$$\underline{g}= (\hspace{-0.05cm}1\hspace{-0.05cm},
 
:$$\underline{g}= (\hspace{-0.05cm}1\hspace{-0.05cm},
\hspace{-0.05cm}1\hspace{-0.05cm},
+
\hspace{-0.07cm}1\hspace{-0.07cm},
\hspace{-0.05cm}1\hspace{-0.05cm},
+
\hspace{-0.07cm}1\hspace{-0.07cm},
\hspace{-0.05cm}0\hspace{-0.05cm},
+
\hspace{-0.07cm}0\hspace{-0.07cm},
\hspace{-0.05cm}1\hspace{-0.05cm},
+
\hspace{-0.07cm}1\hspace{-0.07cm},
\hspace{-0.05cm}1\hspace{-0.05cm},
+
\hspace{-0.07cm}1\hspace{-0.07cm},
\hspace{-0.05cm}0\hspace{-0.05cm},
+
\hspace{-0.07cm}0\hspace{-0.07cm},
\hspace{-0.05cm}1\hspace{-0.05cm},
+
\hspace{-0.07cm}1\hspace{-0.07cm},
\hspace{-0.05cm}1\hspace{-0.05cm},
+
\hspace{-0.07cm}1\hspace{-0.07cm},
... ) \quad \circ\!\!-\!\!\!-^{\hspace{-0.25cm}D}\!\!\!-\!\!\bullet\quad
+
... ) \hspace{0.3cm} \circ\!\!-\!\!\!-^{\hspace{-0.25cm}D}\!\!\!-\!\!\bullet \hspace{0.3cm}
G(D) =  1\hspace{-0.05cm}+\hspace{-0.05cm} D\hspace{-0.05cm} +\hspace{-0.05cm} D^2\hspace{-0.05cm} +\hspace{-0.05cm} D^4 \hspace{-0.05cm}+\hspace{-0.05cm} D^5 \hspace{-0.05cm}+\hspace{-0.05cm} D^7 \hspace{-0.05cm}+\hspace{-0.05cm} D^8 + \hspace{0.05cm} \text{...} \hspace{0.05cm}.$$
+
G(D) =  1\hspace{-0.05cm}+\hspace{-0.05cm} D\hspace{-0.05cm} +\hspace{-0.05cm} D^2\hspace{-0.05cm} +\hspace{-0.05cm} D^4 \hspace{-0.05cm}+\hspace{-0.05cm} D^5 \hspace{-0.05cm}+\hspace{-0.05cm} D^7 \hspace{-0.05cm}+\hspace{-0.05cm} D^8 +   \text{...} .$$
  
 
*Let us now examine the second proposal:
 
*Let us now examine the second proposal:
Line 124: Line 128:
 
cm}+ D^2} \hspace{0.05cm}.$$
 
cm}+ D^2} \hspace{0.05cm}.$$
  
*But since equation (2) is true, the last equation must be false.
+
*But since equation&nbsp; '''(2)'''&nbsp; is true,&nbsp; the last equation must be false.
  
  
  
'''(4)'''&nbsp; Correct is only the <u>proposed solution 1</u>:
+
'''(4)'''&nbsp; Correct is only the&nbsp; <u>proposed solution 1</u>:
*From $\underline{u} = (1, \, 1, \, 1)$ follows $U(D) = 1 + D + D^2$. Thus also holds:
+
*From &nbsp; $\underline{u} = (1, \, 1, \, 1)$ &nbsp; follows &nbsp; $U(D) = 1 + D + D^2$.&nbsp; Thus also holds:
 
:$$P(D) = U(D) \cdot G(D) = (1+D+D^2) \cdot \frac{1+D^2}{1+D+D^2}= 1+D^2\hspace{0.3cm}  
 
:$$P(D) = U(D) \cdot G(D) = (1+D+D^2) \cdot \frac{1+D^2}{1+D+D^2}= 1+D^2\hspace{0.3cm}  
 
\Rightarrow\hspace{0.3cm}  \underline{p}= (\hspace{0.05cm}1\hspace{0.05cm},\hspace{0.05cm} 0\hspace{0.05cm},\hspace{0.05cm} 1\hspace{0.05cm},\hspace{0.05cm} 0\hspace{0.05cm},\hspace{0.05cm} 0\hspace{0.05cm},\hspace{0.05cm}\text{...}\hspace{0.05cm})\hspace{0.05cm}. $$
 
\Rightarrow\hspace{0.3cm}  \underline{p}= (\hspace{0.05cm}1\hspace{0.05cm},\hspace{0.05cm} 0\hspace{0.05cm},\hspace{0.05cm} 1\hspace{0.05cm},\hspace{0.05cm} 0\hspace{0.05cm},\hspace{0.05cm} 0\hspace{0.05cm},\hspace{0.05cm}\text{...}\hspace{0.05cm})\hspace{0.05cm}. $$
* If the variables&nbsp; $u_i$&nbsp; and&nbsp; $g_i$&nbsp; were real-valued, the (discrete) convolution&nbsp; $\underline{p} = \underline{u} * \underline{g}$&nbsp;  would always lead to a broadening&nbsp; &#8658; &nbsp; $\underline{p}$&nbsp; in this case would be broader than&nbsp; $\underline{u}$&nbsp; and also broader than&nbsp; $\underline{g}$.
+
* If the variables &nbsp; $u_i$ &nbsp; and &nbsp; $g_i$ &nbsp; were real-valued,&nbsp; the&nbsp; $($discrete$)$&nbsp; convolution &nbsp; $\underline{p} = \underline{u} * \underline{g} $&nbsp; would always lead to a broadening.
* On the other hand, for&nbsp; $u_i &#8712; {\rm GF}(2)$&nbsp; and&nbsp; $g_i &#8712; {\rm GF}(2)$&nbsp; it may (but need not) happen that even with unbounded&nbsp;  $\underline{u}$&nbsp; or for unbounded&nbsp; $\underline{g}$&nbsp; the convolution product&nbsp; $\underline{p} = \underline{u} * \underline{g}$&nbsp; is bounded.
+
[[File:EN_KC_A_4_9d_v1.png|right|frame|Clarification of&nbsp;  $\underline{p} = (1, \, 1, \, 1, \, 0, \, ...)^{\rm T} \cdot \mathbf{G}$]]
[[File:EN_KC_A_4_9d_v1.png|right|frame|Verdeutlichung von&nbsp;  $\underline{p} = (1, \, 1, \, 1, \, 0, \, ...)^{\rm T} \cdot \mathbf{G}$]]
+
*In this case &nbsp; $\underline{p}$&nbsp; would be broader than &nbsp; $\underline{u}$ &nbsp; and also broader than &nbsp; $\underline{g}$.
*The result is finally checked according to the equation $\underline{p} = \underline{u}^{\rm T} \cdot \mathbf{G}$ is checked.
 
  
 +
* On the other hand,&nbsp;  for &nbsp; $u_i &#8712; {\rm GF}(2)$ &nbsp; and &nbsp; $g_i &#8712; {\rm GF}(2)$ &nbsp; it may&nbsp; $($but need not$)$&nbsp; happen that even with unlimited &nbsp;  $\underline{u}$ &nbsp; or for unlimited &nbsp; $\underline{g}$ &nbsp; the convolution product &nbsp; $\underline{p} = \underline{u} * \underline{g}$&nbsp; is limited.
  
 +
*The result is finally checked according to the equation&nbsp; $\underline{p} = \underline{u}^{\rm T} \cdot \mathbf{G}$&nbsp; is checked.&nbsp; See graph on the right.
  
'''(5)'''&nbsp; Following a similar procedure as in [[Aufgaben:Exercise_4.08:_Repetition_to_the_Convolutional_Codes|"Exercise A4.8, (4)"]], one can see:
+
 
*The free distance is again determined by the path&nbsp; $S_0 &#8594; S_0 &#8594; S_1 &#8594; S_2 &#8594; S_0 &#8594; S_0 &#8594; \hspace{0.05cm}\text{...}\hspace{0.05cm}$.
+
 
*But the associated code sequence&nbsp; $\underline{x}$&nbsp; is now &nbsp;" $00 \ 11 \ 10 \ 11 \ 00 \ ... $".  
+
'''(5)'''&nbsp; Following a similar procedure as in&nbsp; [[Aufgaben:Exercise_4.08:_Repetition_to_the_Convolutional_Codes|$\text{Exercise A4.8}$,&nbsp; (4)]],&nbsp; one can see:
*This gives the free distance to&nbsp; $d_{\rm F} \ \underline{= 5}$.  
+
*The free distance is again determined by the path&nbsp;  
*In contrast, in the non-recursive code (exercise 4.8), the free distance was&nbsp; $d_{\rm F} = 3$.
+
:$$S_0 &#8594; S_0 &#8594; S_1 &#8594; S_2 &#8594; S_0 &#8594; S_0 &#8594; \hspace{0.05cm}\text{...}\hspace{0.05cm}.$$  
 +
*But the associated encoded sequence&nbsp; $\underline{x}$&nbsp; is now &nbsp;" $00 \ 11 \ 10 \ 11 \ 00 \ ... $".
 +
 +
*This gives the free distance to&nbsp; $d_{\rm F} \ \underline{= 5}$.
 +
 +
*In contrast,&nbsp; in the non-recursive code&nbsp; $($Exercise 4.8$)$,&nbsp; the free distance was&nbsp; $d_{\rm F} = 3$.
 
{{ML-Fuß}}
 
{{ML-Fuß}}
  

Latest revision as of 17:06, 13 March 2023

State transition diagram
of an RSC code

In  $\text{Exercise 4.8}$  important properties of convolutional codes have already been derived from the state transition diagram,  assuming a non-recursive filter structure.

Now a rate  $1/2$  RSC code is treated in a similar manner.  Here  $\rm RSC$  stands for  "recursive systematic convolutional".

The transfer function matrix of an RSC convolutional code can be specified as follows:

$${\boldsymbol{\rm G}}(D) = \left [ 1\hspace{0.05cm},\hspace{0.3cm} G^{(2)}(D)/G^{(1)}(D) \right ] \hspace{0.05cm}.$$

Otherwise,  exactly the same conditions apply here as in Exercise 4.8.  We refer again to the following theory pages:

  1. "Systematic convolutional codes"
  2. "Representation in the state transition diagram"
  3. "Definition of the free distance"
  4. "GF(2) description forms of a digital filter"
  5. "Application of the  $D$–transform to rate  $1/n$  convolution encoders"
  6. "Filter structure with fractional–rational transfer function"


In the state transition diagram,  two arrows go from each state.  The label is  "$u_i \hspace{0.05cm}| \hspace{0.05cm} x_i^{(1)}x_i^{(2)}$".  For a systematic code,  this involves:

  • The first code bit is identical to the information bit:   $\hspace{0.2cm} x_i^{(1)} = u_i ∈ \{0, \, 1\}$.
  • The second code bit is the parity-check bit:   $\hspace{0.2cm} x_i^{(2)} = p_i ∈ \{0, \, 1\}$.




Hints:

  • The following vectorial quantities are used in the questions for this exercise:
  • the information sequence:  $\hspace{0.2cm} \underline{u} = (u_1, \, u_2, \text{...} \hspace{0.05cm} )$,
  • the parity-check sequence:  $\hspace{0.2cm} \underline{p} = (p_1, \, p_2, \text{...} \hspace{0.05cm})$,
  • the impulse response:  $\hspace{0.2cm} \underline{g} = (g_1, \, g_2, \text{...} \hspace{0.05cm} ); \hspace{0.2cm}$ this is equal to the parity sequence  $\underline{p}$  for  $\underline{u} = (1, \, 0, \, 0, \text{...} \hspace{0.05cm} )$.


Questions

1

What is the impulse response  $\underline{g}$ ?

  $\underline{g} = (1, \, 1, \, 1, \, 0, \, 1, \, 1, \, 0, \, 1, \, 1, \text{...} \hspace{0.05cm})$.
  $\underline{g} = (1, \, 0, \, 1, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \text{...} \hspace{0.05cm})$.

2

It holds   $\underline{u} = (1, \, 1, \, 0, \, 1)$.  Which statements hold for the parity sequence  $\underline{p}$ ?

  $\underline{p} = (1, \, 0, \, 1, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \text{...} \hspace{0.05cm})$.
  $\underline{p} = (1, \, 0, \, 0, \, 0, \, 0, \, 1, \, 1, \, 0, \, 1, \, 1, \, 0, \, 1, \text{...} \hspace{0.05cm})$.
With limited information sequence  $\underline{u}$   ⇒   $\underline{p}$  is also limited.

3

What is the  $D$–transfer function  $G(D)$?

  $G(D) = 1 + D + D^2 + D^4 + D^5 + D^7 + D^8 + \text{...} \hspace{0.05cm}$.
  $G(D) = (1 + D^2)/(1 + D + D^2)$.
  $G(D) = (1 + D + D^2)/(1 + D^2)$.

4

Now let  $\underline{u} = (1, \, 1, \, 1)$.  Which statements hold for the parity sequence  $\underline{p}$?

  $\underline{p} = (1, \, 0, \, 1, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \text{...} \hspace{0.05cm})$.
  $\underline{p} = (1, \, 0, \, 0, \, 0, \, 0, \, 1, \, 1, \, 0, \, 1, \, 1, \, 0, \, 1, \text{...} \hspace{0.05cm})$.
With limited information sequence  $\underline{u}$   ⇒   $\underline{p}$  is also limited.

5

What is the free distance  $d_{\rm F}$  of this RSC encoder?

$d_{\rm F} \ = \ $


Solution

(1)  Tracing the transitions in the state diagram for the sequence   $\underline{u} = (1, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0, \, 0)$   at the input,  we get the path

$$S_0 → S_1 → S_3 → S_2 → S_1 → S_3 → S_2 → S_1 → S_3 → \hspace{0.05cm}\text{...} \hspace{0.05cm}$$
  • For each transition,  the first code symbol  $x_i^{(1)}$  is equal to the information bit  $u_i$  and the code symbol  $x_i^{(2)}$  indicates the parity-check bit  $p_i$.
  • This gives the result corresponding to solution proposition 1:
$$\underline{p}= (\hspace{0.05cm}1\hspace{0.05cm}, \hspace{0.05cm}1\hspace{0.05cm}, \hspace{0.05cm}1\hspace{0.05cm}, \hspace{0.05cm} 0\hspace{0.05cm}, \hspace{0.05cm} 1\hspace{0.05cm}, \hspace{0.05cm} 1\hspace{0.05cm}, \hspace{0.05cm} 0\hspace{0.05cm}, \hspace{0.05cm} 1\hspace{0.05cm}, \hspace{0.05cm} 1\hspace{0.05cm},\hspace{0.05cm}\text{...} \hspace{0.05cm}) = \underline{g}\hspace{0.05cm}.$$
  • For any RSC code,  the impulse response  $\underline{g}$  is infinite in length and becomes periodic at some point,  in this example with period  $P = 3$  and  "$0, \, 1, \, 1$".


Clarification of  $\underline{p} = (1, \, 1, \, 0, \, 1)^{\rm T} \cdot \mathbf{G}$

(2)  The graph shows the solution of this exercise according to the equation  $\underline{p} = \underline{u}^{\rm T} \cdot \mathbf{G}$.

  • Here the generator matrix  $\mathbf{G}$  is infinitely extended downward and to the right.
  • The correct solution is  proposal 2.


(3)  Correct are  the proposed solutions 1 and 2:

  • Between the impulse response  $\underline{g}$  and the  $D$–transfer function  $\mathbf{G}(D)$  there is the relation according to the first proposed solution:
$$\underline{g}= (\hspace{-0.05cm}1\hspace{-0.05cm}, \hspace{-0.07cm}1\hspace{-0.07cm}, \hspace{-0.07cm}1\hspace{-0.07cm}, \hspace{-0.07cm}0\hspace{-0.07cm}, \hspace{-0.07cm}1\hspace{-0.07cm}, \hspace{-0.07cm}1\hspace{-0.07cm}, \hspace{-0.07cm}0\hspace{-0.07cm}, \hspace{-0.07cm}1\hspace{-0.07cm}, \hspace{-0.07cm}1\hspace{-0.07cm}, ... ) \hspace{0.3cm} \circ\!\!-\!\!\!-^{\hspace{-0.25cm}D}\!\!\!-\!\!\bullet \hspace{0.3cm} G(D) = 1\hspace{-0.05cm}+\hspace{-0.05cm} D\hspace{-0.05cm} +\hspace{-0.05cm} D^2\hspace{-0.05cm} +\hspace{-0.05cm} D^4 \hspace{-0.05cm}+\hspace{-0.05cm} D^5 \hspace{-0.05cm}+\hspace{-0.05cm} D^7 \hspace{-0.05cm}+\hspace{-0.05cm} D^8 + \text{...} .$$
  • Let us now examine the second proposal:
$$G(D) = \frac{1+ D^2}{1+ D + D^2} \hspace{0.3cm}\Rightarrow \hspace{0.3cm} G(D) \cdot [1+ D + D^2] = 1+ D^2 \hspace{0.05cm}.$$
  • The following calculation shows that this equation is indeed true:
$$(1+ D+ D^2+ D^4 +D^5 + D^7 + D^8 + \hspace{0.05cm} \text{...}) \cdot (1+ D+ D^2 ) =$$
$$=1+ D+ D^2\hspace{1.05cm} +D^4 + D^5 \hspace{1.05cm} +D^7 + D^8 \hspace{1.05cm} + D^{10}+ \hspace{0.05cm} \text{...}$$
$$+ \hspace{0.8cm}D+ D^2+D^3 \hspace{1.05cm}+ D^5 + D^6 \hspace{1.05cm} +D^8 + D^9 \hspace{1.25cm} +\hspace{0.05cm} \text{...} $$
$$+ \hspace{1.63cm} D^2+D^3+ D^4 \hspace{1.05cm}+ D^6 +D^7 \hspace{1.05cm}+ D^9 + D^{10} \hspace{0.12cm}+ \hspace{0.05cm} \text{...}$$
$$=\underline{1\hspace{0.72 cm}+ D^2} \hspace{0.05cm}.$$
  • But since equation  (2)  is true,  the last equation must be false.


(4)  Correct is only the  proposed solution 1:

  • From   $\underline{u} = (1, \, 1, \, 1)$   follows   $U(D) = 1 + D + D^2$.  Thus also holds:
$$P(D) = U(D) \cdot G(D) = (1+D+D^2) \cdot \frac{1+D^2}{1+D+D^2}= 1+D^2\hspace{0.3cm} \Rightarrow\hspace{0.3cm} \underline{p}= (\hspace{0.05cm}1\hspace{0.05cm},\hspace{0.05cm} 0\hspace{0.05cm},\hspace{0.05cm} 1\hspace{0.05cm},\hspace{0.05cm} 0\hspace{0.05cm},\hspace{0.05cm} 0\hspace{0.05cm},\hspace{0.05cm}\text{...}\hspace{0.05cm})\hspace{0.05cm}. $$
  • If the variables   $u_i$   and   $g_i$   were real-valued,  the  $($discrete$)$  convolution   $\underline{p} = \underline{u} * \underline{g} $  would always lead to a broadening.
Clarification of  $\underline{p} = (1, \, 1, \, 1, \, 0, \, ...)^{\rm T} \cdot \mathbf{G}$
  • In this case   $\underline{p}$  would be broader than   $\underline{u}$   and also broader than   $\underline{g}$.
  • On the other hand,  for   $u_i ∈ {\rm GF}(2)$   and   $g_i ∈ {\rm GF}(2)$   it may  $($but need not$)$  happen that even with unlimited   $\underline{u}$   or for unlimited   $\underline{g}$   the convolution product   $\underline{p} = \underline{u} * \underline{g}$  is limited.
  • The result is finally checked according to the equation  $\underline{p} = \underline{u}^{\rm T} \cdot \mathbf{G}$  is checked.  See graph on the right.


(5)  Following a similar procedure as in  $\text{Exercise A4.8}$,  (4),  one can see:

  • The free distance is again determined by the path 
$$S_0 → S_0 → S_1 → S_2 → S_0 → S_0 → \hspace{0.05cm}\text{...}\hspace{0.05cm}.$$
  • But the associated encoded sequence  $\underline{x}$  is now  " $00 \ 11 \ 10 \ 11 \ 00 \ ... $".
  • This gives the free distance to  $d_{\rm F} \ \underline{= 5}$.
  • In contrast,  in the non-recursive code  $($Exercise 4.8$)$,  the free distance was  $d_{\rm F} = 3$.