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This sequence is the convolution of Fibonacci numbers with themselves. The recurrence is

a[n] = a[n-1] + a[n-2] + Fibonacci[n+2]

If you assume Fibonacci sequence to start from 0,1,1,2,3,5 ... (http://oeis.org/A213587)

How can I generate it is logarithmic time or faster? Please note that this is no homework nor any contest problem. I am working on Fibonacci applied sequences.

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8  
Do you need the whole sequence? Because there isn't going to be a way to generate O(n) numbers in O(log(n)). If you just need the nth Number look at wikipedia for a direct calculation formula. –  Grizzly Sep 3 '12 at 18:37
    
Even copying from an already-done array is O(n) –  huseyin tugrul buyukisik Sep 3 '12 at 18:41
1  
I want to calculate nth term of the sequence in nth time without using memorizing any values. –  thedarkknight Sep 3 '12 at 18:59
    
@Grizzly:Sir read my comments in response to the first answer for clarifications –  thedarkknight Sep 3 '12 at 19:11
    
@tuğrulbüyükışık:Sir read my comments in response to the first answer for clarifications –  thedarkknight Sep 3 '12 at 19:11

3 Answers 3

Here's a closed formula and as such almost guaranteed to be O(1) (calculated using Mathematica)

Input:

RSolve[{a[n] == a[n - 2] + a[n - 1] + Fibonacci[n + 2], a[1] == 1, a[2] == 4}, a[n], n]

Output (click here for full size):

link

You will have to use some floating-point arithmetics but you can still get much precision from a double datatype. If precision is an issue, use GMP or some other arbitrary precision library.

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,I am bounded to use a pure programming language without any additional library.I code in c/c++/java/python ,so I ideally want a solution using features available in either of these languages. –  thedarkknight Sep 3 '12 at 19:46
    
@thedarkknight: why would you need additional librarys to use that forumla? (though personally I would go with the one from wikipedia (linked in my comment on your question), due to it being more easily expressed). –  Grizzly Sep 4 '12 at 12:49

This is not the actual answer to the question, just an approach to generate the whole sequence in O(n)

Provided you mean O(log(n)) time complexity to calculate just the n'th element, not all up to n it is actually quite easy. If you iterate through, you can easily do O(1) for each element with proper memoization.

I'll suppose this:

a[1] = 1, a[2] = 1, fib[1] = 0, fib[2] = 1, fib[3] = 1

Then just iterate and memorize a[n-1] and a[n-2] as well as fib[n-1] and fib[n-2] along the way:

long an_1 = 1;  // a[2]
long an_2 = 1;  // a[1]
long fib_1 = 2; // fib[4]
long fib_2 = 1; // fib[3]

// Starts with a[3]
while (true)
{
    long fib = fib_1 + fib_2;
    long an = an_1 + an_2 + fib;

    std::cout << an;

    fib_2 = fib_1;
    fib_1 = fib;
    an_2 = an_1;
    an_1 = an;
}

Edit: this is called amortized complexity. Computing up to the n-th element requires O(n) steps, but as you have all elements from 1 to n available when you reach this point the cost of computing each element is O(1). The formal proof is a bit more elaborated but this is the idea.

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Wouldn't that give you O(n) time? –  Shahbaz Sep 3 '12 at 18:56
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I want to calculate nth term of the sequence in nth time without using memorizing any values. –  thedarkknight Sep 3 '12 at 18:59
    
@Shahbaz As I clarified in the answer, that is O(n) for the whole sequence, O(1) for each individual term. Of course, you cannot calculate an individual term with this algorithm. –  Tibor Sep 3 '12 at 19:00
    
I want to calculate all values at run time no precomputation. –  thedarkknight Sep 3 '12 at 19:01
1  
@thedarkknight I'm here. Late, but you misspelled my name ;) You may be interested in this similar topic. Analogous to the derivation there, you get the (simpler) formula a(n) = (5*n*Luc(n+3) - 2*(Luc(n+1) + Luc(n-1)))/25. –  Daniel Fischer Sep 3 '12 at 20:33
up vote 1 down vote accepted

I was able to solve this in log n time by converting the recurrence relation to a fibonacci convolution..In the end ,the recurrence relation contained only Lucas Number and Fibonacci Number.So I was able to solve it in 2*log n .I will write the whole proof here once I figure out how to write mathematical symbols here.

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