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My requirement is for a code to find the number of combinations of two digits only 0 and 1 for X digit size which may vary from 1 .. 1000 such that no time two 1 can be immediately in sequence but 0's are possible

Say for input of 4 digit we have

1010 1000 0000 0101 0001 0010 0100 1001 

I am not sure which of algos to generate such a combinations of 0's and 1's?

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Is it homework??? –  Sachin Mhetre Apr 27 '12 at 5:57
    
Well actually I am not getting the logic so in need to seek some advice - if once can specify the approach I can do the coding –  Prakash Apr 27 '12 at 5:59
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3 Answers

up vote 7 down vote accepted

The answer is given by the Fibonacci sequence.

f(n) = f(n-1) + f(n-2)

Here are the first few results:

length     number of combinations
1          2   (0, 1)
2          3   (00, 01, 10)
3          5   (000, 001, 010, 100, 101)
4          8   (0000, 0001, 0010, 0100, 0101, 1000, 1001, 1010)

You can see the why there is a relationship to the Fibonacci sequence if you consider strings starting with "0" or "10" separately:

  number of sequences of n digits
= number of sequences starting with 0, followed by n-1 more digits
+ number of sequences starting with 10, followed by n-2 more digits

Sequences starting with "11" are disallowed.

The Fibonacci numbers can be calculated very quickly if an appropriate technique is used, but you should be aware that the answer will grow very quickly as maxlen increases. If you want to have an exact answer you will need to use a library that can work with arbitrary large integers.

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One question: did you know of this relation, or did you just happen to see that they are the same. Hats off to you in either case. :) –  vhallac Apr 27 '12 at 6:36
    
I understood the Fibonnaci Sequence where F(n) series is the sum of its previous two in sequence with seed value as 0 and 1 but not able to understand the length and combinations stuff - how is it derived? –  Prakash Apr 27 '12 at 6:57
    
@Prakash: number of combinations = F(X + 2) –  Mark Byers Apr 27 '12 at 6:59
    
That's great any mathematical explanation for same: 0 1 1 2 3 5 8 F(4) = F(6) = 8 –  Prakash Apr 27 '12 at 7:06
    
@vhallac: I've seen similar problems before, and they can usually be solved with recurrence relationships. I tried to write the recurrence relationship and noticed it looked familiar. –  Mark Byers Apr 27 '12 at 7:06
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One idea is to build the complete string by using the words 10 and 0 (and 1, but only at the very end).

build(sofar, maxlen):
  if len(sofar) > maxlen: return
  if len(sofar) == maxlen: found(sofar); return
  if len(sofar) == maxlen - 1: build(sofar + "1", maxlen)
  build(sofar + "10", maxlen)
  build(sofar + "0", maxlen)

The proof that this algorithm only generates valid sequences is left to you. Same with the proof that this algorithm generates all valid sequences.

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I was thinking of counting normally, then replacing each 1 with 01, and finally throwing out the excess on the most significant part. But was having problem with repetitions. This is nicer. :) –  vhallac Apr 27 '12 at 6:15
    
I think this algorithm might be slow for maxlen = 1000. –  Mark Byers Apr 27 '12 at 6:17
    
Indeed. Your answer is much more elegant. –  Roland Illig Apr 27 '12 at 6:25
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How about having a function that generates these values into arrays, and another function that just checks if the current index to a value in the array is a '1' and checks if the next value is a '1' or not? If true, then discard; else, valid.

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