How do generate this Huffmann Tree (similar to binary trees)

I understand how to create Huffmann trees when the frequencies are different to each other but how would I draw this huffmann tree if few of the frequencies are the same:

simple explanation of the Huffmann trees is found here

The data of the Huffmann tree I am trying to create:

``````Letter Frequency
A       15%
B       15%
C       10%
D       10%
E       30%
F       20%
``````

Now I start with the two lowest frequencies which are for Letter `C` and `D`

``````   .
/ \
C   D
``````

But what would be the next step? because we have `A` and `B` with the same frequencies so which one do we choose? If we choose one of them, then how will the structure look when the second one is chosen?

If I choose `B` then it will look like this (unless I am wrong)

``````     .
/ \
B   .
/ \
C   D
``````

These can be coded in Java and C as well and I am trying to figure out how these work first before implementing them.

EDIT

My tree looks like this:

``````         ___________|_________________
/\                            |
/  \                           |
F    E                          |
/ \                              |
/   \                             |
B     A                           /\
/  \
C    D
``````

Also got an example from online

-
You always pick the two lowest frequencies, so your second step is wrong. You don't pick CD and B (20% and 15% respectively) -- you pick A and B (15% and 15%). For this particular set of frequencies, there is never ambiguity in picking the lowest two. However that can happen. You can have sets of frequencies with several different trees with different topologies. However all of them have exactly the same average number of bits with the frequencies applied and all are optimal. –  Mark Adler Aug 14 '12 at 15:23

``````A = 15%
B = 15%
C = 10% *
D = 10% *
E = 30%
F = 20%
``````

You pick two lowest (C+D) and join them (their sum is 20.

``````  20
/ \
C   D
``````

You now have

``````A = 15%  *
B = 15%  *
C+D = 20%
E = 30%
F = 20%
``````

Now you join another two lowest (A, B) which sums to 30.

``````      20      30
/ \     / \
C   D    A  B
``````

You now have

``````A+B = 30%
C+D = 20% *
E = 30%
F = 20%   *
``````

Lowest are (C+D, F), so you join them

``````    40
/  \
F   20      30
/ \     / \
C   D    A  B

A+B = 30% *
C+D+F = 40%
E = 30% *
``````

Next step, same as before:

``````A+B+E = 60% *
C+D+F = 40% *

100
/   \
40        60
/  \      /  \
F   20    E    30
/ \        / \
C   D       A  B
``````
-
The above is correct. –  Mark Adler Aug 14 '12 at 18:18

you will be have the some code for any equal frequancy.

``````|     letter      |  A  |  B  |  C  |  D  |  E  |  F  |
|-----------------|-----|-----|-----|-----|-----|-----|
|      freq       |  10 |  20 |  30 |  5  |  25 |  10 |
|-----------------|-----|-----|-----|-----|-----|-----|
``````

sort by max

``````|-----------------|-----|-----|-----|-----|-----|-----|
|     letter      |  C  |  E  |  B  |  F  |  A  |  D  |
|-----------------|-----|-----|-----|-----|-----|-----|
|      freq       |  30 |  25 |  20 |  10 |  10 |  5  |
|-----------------|-----|-----|-----|-----|-----|-----|
``````

`tree creating`

``````freq           30    10     5     10     20     25
symbol          C     A     D      F      B      E
|     |
|--|--|
||-|
|15|  = 5 + 10
``````

`2 step`

``````freq          30    10     5     10     20     25
symbol         C     A     D      F      B      E
|     |      |
|     |      |
| |--||      |
|-|15||      |
||-|       |
|         |
|    |--| |
|----|25|-| = 10 + 15
|--|
``````

`3 step`

``````freq         30    10     5     10     20     25
sym          C     A     D      F      B      E
|     |     |      |      |      |
|     |     |      |      |      |
|     | |--||      |      |      |
|     |-|15||      |      |      |
|       ||-|       |      |      |
|        |         |      |      |
|        |    |--| |      | |--| |
|        |----|25|-|      |-|45|-|
|             ||-|          ||-|
|    |--|      |             |
|----|55|------|             |
|-||                    |
|   |------------|    |
|---| Root (100) |----|
|------------|
``````

encoding:

``````   C = 00
A = 0100
D = 0101
F = 011
B = 10
E = 11
``````
-
asci charts, lovely :) –  bestsss Aug 14 '12 at 11:05
I understand step 1 and 2 but dont understand what you did for step 3. why did you include B and E as seperate?? –  Bic B Aug 14 '12 at 11:07
@AmberArroway you should sum close freqs. hence: `1 (10 and 5 = 15) `2 (15 and 10 = 25)` `3 (25 and 30)` and ` 4: (20 and 25)` `5 (55 and 45)` I didt separated 3 and 4 step. –  Zagorulkin Dmitry Aug 14 '12 at 11:11
Let me post the tree I have drawn, can you tell me where I have gone wrong please? –  Bic B Aug 14 '12 at 11:13
@AmberArroway could you ask what you didt understood? i will try to answer on your question. –  Zagorulkin Dmitry Aug 14 '12 at 11:15

It doesn't really matter which you choose for, you will get a bit different encoding, but with same probabilities. There are more possible ways to build tree in some cases, but it doesn't matter.

I've edited the image because I made a mistake, check out my second answer for correct one though.

-
Another answer is different to yours...which one is right haha –  Bic B Aug 14 '12 at 11:00
I am pretty sure this one is correct. I've had it at uni+exam, unless I made some stupid mistake (but I checked it), but the way I created it is correct. If you were to follow Lajos Arpad's way you would end up always with such deep tree, which I believe is not correct. –  KadekM Aug 14 '12 at 11:02
His one looks different to mine even, Ill include the tree I have drawn –  Bic B Aug 14 '12 at 11:10
The way to create tree is very simple, you always pick two subtrees with lowest probability and join them. At start you have 7 subtrees. Once you start connecting them into bigger tree, their probability sum at their parent. –  KadekM Aug 14 '12 at 11:13
have a look at the image i uploaded –  Bic B Aug 14 '12 at 11:19