Difference between revisions of "Aufgaben:Exercise 3.7: Comparison of Two Convolutional Encoders"

Revision as of 15:01, 3 October 2022

Two convolutional encoders with parameters $n = 2, \ k = 1, \ m = 2$

The graph shows two rate $1/2$ convolutional encoders, each with memory $m = 2$:

The coder $\rm A$ has the transfer function matrix $\mathbf{G}(D) = (1 + D^2, \ 1 + D + D^2)$.
In the coder $\rm B$ the two filters (top and bottom) are interchanged, and it holds : $\mathbf{G}(D) = (1 + D + D^2, \ 1 + D^2)$.

The lower encoder $\rm B$ has already been treated in detail in the theory part.

In the present exercise, you are to first determine the state transition diagram for coder $\rm A$ and then work out the differences and the similarities between the two state diagrams.

Hints:

This exercise belongs to the chapter "Code description with state and trellis diagram".
Reference is made in particular to the sections.
- "State definition for a memory register" and.
- "Representation in the state transition diagram".

Questions

Solution

Calculation of the code sequence

(1) The calculation is based on the equations.

$$x_i^{(1)} = u_i + u_{i–2},$$

$$x_i^{(2)} = u_i + u_{i–1} + u_{i–2}.$$

Initially, the two memories ($u_{i–1}$ and $u_{i–2}$) are preallocated with zeros ⇒ $s_1 = S_0$.
With $u_1 = 0$, we get $\underline{x}_1 = (00)$ and $s_2 = S_0$.
With $u_2 = 1$ one obtains the output $\underline{x}_2 = (11)$ and the new state $s_3 = S_3$.

From the adjacent calculation scheme one recognizes the correctness of the proposed solutions 1 and 4.

State transition diagram of encoder $\rm A$

(2) All proposed solutions are correct:

This can be seen by evaluating the table at (1).
The results are shown in the adjacent graph.

State transition diagram of encoder $\rm B$

(3) Correct is only statement 3:

The state transition diagram of Coder $\rm B$ is sketched on the right. For derivation and interpretation, see section "Representation in the state transition diagram".
If we swap the two output bits $x_i^{(1)}$ and $x_i^{(2)}$, we get from the convolutional encoder $\rm A$ to the convolutional encoder $\rm B$ (and vice versa).

@@ Line 18: / Line 18: @@
 Hints:
-*This exercise belongs to the chapter&nbsp; [[Channel_Coding/Code_Description_with_State_and_Trellis_Diagram| "Code description with state&ndash; and trellis diagram"]].
+*This exercise belongs to the chapter&nbsp; [[Channel_Coding/Code_Description_with_State_and_Trellis_Diagram| "Code description with state and trellis diagram"]].
 *Reference is made in particular to the sections.
 **&nbsp; [[Channel_Coding/Code_Description_with_State_and_Trellis_Diagram#State_definition_for_a_memory_register|"State definition for a memory register"]]&nbsp; and.

	$\underline{x}^{(1)} = (0, \, 1, \, 1, \, 0, \, 1, \, 0, \, 0, \, 1, \, \text{...}\hspace{0.05cm})$,
	$\underline{x}^{(1)} = (0, \, 1, \, 0, \, 1, \, 0, \, 0, \, 1, \, 1, \, \text{...}\hspace{0.05cm})$,
	$\underline{x}^{(2)} = (0, \, 1, \, 1, \, 0, \, 1, \, 0, \, 0, \, 1, \, \text{...}\hspace{0.05cm})$,
	$\underline{x}^{(2)} = (0, \, 1, \, 0, \, 1, \, 0, \, 0, \, 1, \, 1, \, \text{...}\hspace{0.05cm})$.

	$s_i = S_0, \ u_i = 0 \ ⇒ \ s_{i+1} = S_0; \hspace{1cm} s_i = S_0, \ u_i = 1 \ ⇒ \ s_{i+1} = S_1$.
	$s_i = S_1, \ u_i = 0 \ ⇒ \ s_{i+1} = S_2; \hspace{1cm} s_i = S_1, \ u_i = 1 \ ⇒ \ s_{i+1} = S_3$.
	$s_i = S_2, \ u_i = 0 \ ⇒ \ s_{i+1} = S_0; \hspace{1cm} s_i = S_2, \ u_i = 1 \ ⇒ \ s_{i+1} = S_1$.
	$s_i = S_3, \ u_i = 0 \ ⇒ \ s_{i+1} = S_2; \hspace{1cm} s_i = S_3, \ u_i = 1 \ ⇒ \ s_{i+1} = S_3$.

	Other state transitions are possible.
	All eight transitions have different code sequences.
	Differences exist only for the code sequences $(01)$ and $(10)$.