# Shortest Bit Sequence Logic

I am trying to understand how does the shortest bit sequence work. I mean the logic. I need to create a program for it but don't know actually what is this shortest bit sequence. I tried to google but in vain. I came across this Question on SO but I cant understand anything from it. Can anyone explain it to me or guide me somewhere where I can understand the logic behind this?

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Is this relevant? stackoverflow.com/questions/818847/… –  Frank Kusters May 21 '13 at 7:32
The shortest bit sequence for what? The shortest sequence period is the empty sequence. I assume that's not what you want. –  harold May 21 '13 at 7:35
@harold for example the shortest bit sequence for 42 is [0, 1, 1, 1, 1, 1, 1]. I want to understand the logic behind it. –  Leonidus May 21 '13 at 7:39
So, you want to represent some value in base (-2) ? –  Jan Dvorak May 21 '13 at 7:41
@JanDvorak yes I think. –  Leonidus May 21 '13 at 8:45

As Jan Dvorak pointed out in the comments, it's simply a number written in base `-2`.

Consider your example `[0, 1, 1, 1, 1, 1, 1]`.

The exponents of `-2` are the same as for 2, but with alternating signs:

``````(-2)^0 =   1
(-2)^1 =  -2
(-2)^2 =   4
(-2)^3 =  -8
(-2)^4 =  16
(-2)^5 = -32
(-2)^6 =  64
...
``````

In the bit sequence notation lowest exponents come first, that is the order is reversed compared to ordinary binary numbers.

``````[0, 1, 1, 1, 1, 1, 1] = 0 * (-2)^0  +
1 * (-2)^1  +
1 * (-2)^2  +
1 * (-2)^3  +
1 * (-2)^4  +
1 * (-2)^5  +
1 * (-2)^6
``````

which gives (from the bottom up)

``````[0, 1, 1, 1, 1, 1, 1] = 64 - 32 + 16 - 8 + 4 - 2 = 42
``````
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I am sorry for my benightedness but How can I generate 0111111 from 42 ? just the reverse of what you did here ? –  Leonidus May 21 '13 at 12:09
Initially I would only have a number then from that I will have to generate the bit sequence since the binary of 42 is 101010 I cant relate 0111111 from it. –  Leonidus May 21 '13 at 12:16
This was explained in the question you linked in your original post. Follow the three steps described there and you have your algorithm. –  ComicSansMS May 21 '13 at 12:40
Can you please give me some other link ? I really cant understand what is explained their. –  Leonidus May 21 '13 at 13:21
What exactly do you not understand? I assume you do already know how to convert decimals to ordinary binaries? The identities presented in the linked answer for calculating the "negative binary" and the simplification are a little bit tricky, so be sure to play around with them on paper to see what's going on. If you can give a more concrete explanation of what troubles you, feel free to ask. –  ComicSansMS May 21 '13 at 13:27