# Count the total number of subsets that don't have consecutive elements

I'm trying to solve pretty complex problem with combinatorics and counting subsets. First of all let's say we have given set A = {1, 2, 3, ... N} where N <= 10^(18). Now we want to count subsets that don't have consecutive numbers in their representation.

Example

Let's say N = 3, and A = {1,2,3}. There are 2^3 total subsets but we don't want to count the subsets (1,2), (2,3) and (1,2,3). So in total for this question we want to answer 5 because we want to count only the remaining 5 subsets. Those subsets are (Empty subset), (1), (2), (3), (1,3). Also we want to print the result modulo 10^9 + 7.

What I've done so far

I was thinking that this should be solved using dynamical programming with two states (are we taking the i-th element or not), but then I saw that N could go up to 10^18, so I was thinking that this should be solved using mathematical formula. Can you please give me some hints where should I start to get the formula.

• Think Fibonacci numbers. – user58697 Jun 11 '17 at 16:01
• You'll have to use Fibonacci sequence for this one - the formula is quite trivial: F(n+2) . You didn't mention what language you want the algorithm to be implemented in. – zwer Jun 11 '17 at 16:03

• Good explanation. +1 from me. You can use `fast doubling` method to calculate `n`th fibonacci term in `O(log n)` complexity. Check this article. – Sanket Makani Jun 11 '17 at 16:15