# variation of Fibonacci (algorithm) A(n) = A(n-1) + A(n-2) + 1 [closed]

I want to write some algorithm that solves `A(n)`

`A(n) = A(n-1) + A(n-2) + 1 (where A(0)=A(1)=0)`

Algorithm of which the time complexity is logarithmic in n, i.e., `O(logn)`.

(I can manipulate only integers. cannot deal with any real number or complex on)

my guess its a variation of Fibonacci

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and your question is...? If you want to write it, please go ahead and do so. Come back if you have difficulties. –  duffymo Oct 8 '12 at 10:35
What is your question? Implementation? Complexity analysis? In any case, what have you tried? –  nhahtdh Oct 8 '12 at 10:35
I just write pseudocode.. –  user1728507 Oct 8 '12 at 10:37
So what do you want to ask exactly? –  nhahtdh Oct 8 '12 at 10:37
It doesn't seem like you want to write this yourself –  ᴋᴇʏsᴇʀ Oct 8 '12 at 10:38

## closed as not a real question by duffymo, nhahtdh, Mark, Craig Ringer, Simone CarlettiOct 8 '12 at 11:22

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Try to note T(n)=A(n)+1, then

`T(n)` = `A(n)`+`1` = `A(n-1)+A(n-2)+1`+`1` = `A(n-1)+1`+`A(n-2)+1`,

thus `T(n)` = `(A(n-1)+1)` + `(A(n-2)+1)` = `T(n-1)` + `T(n-2)`.

then we can calculate T(n) by how we calculate Fibonacci number.

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