Derive a homogenous linear recurrence from x_n=2^n+F_n

Felix Cohen

Felix Cohen

Answered question

2022-09-05

Derive a homogenous linear recurrence from x n = 2 n + F n
Suppose that the sequence x n satisfies that
x n = 2 n + F n
where { F n } denotes the Fibonacci sequence, I want to derive a homogenous linear recurrence for x n
I can show that
x n x n 1 x n 2 = 1 4 2 n
By plug in the relationship of Fib Sequence, however the above is non-homogenous, can anyone help?

Answer & Explanation

Mohammed Farley

Mohammed Farley

Beginner2022-09-06Added 15 answers

Step 1
The sequence 2 n solves the homogeneous linear recurrence x n 2 x n 1 = 0 and F n solves the homogeneous linear recurrence x n x n 1 x n 2 = 0. Now consider the homogeneous linear recurrence whose characteristic polynomial is the product
( x 2 ) ( x 2 x 1 ) = x 3 3 x 2 + x + 2.
Step 2
Since it has 3 distinct roots, that is 2 and 1 ± 5 2 , then all solutions of the homogeneous linear recurrence of order 3,
x n 3 x n 1 + x n 2 + 2 x n 3 = 0
are given by
x n = C 1 2 n + C 2 ( 1 + 5 2 ) n + C 3 ( 1 5 2 ) n .
Your sequence 2 n + F n is just one of them: C 1 = 1, C 2 = 1 5 and C 3 = 1 5 .
Sugainkohr

Sugainkohr

Beginner2022-09-07Added 13 answers

Step 1
The following fills in the missing step in OP's approach.
I can show that x n x n 1 x n 2 = 1 4 2 n
You are almost done at this point. All that's left to do is eliminate the power terms between two consecutive relations:
(1) x n x n 1 x n 2 = 1 4 2 n (2) x n + 1 x n x n 1 = 1 4 2 n + 1
Step 2
Multiplying and subtracting ( 2 ) 2 × ( 1 ) gives:
x n + 1 x n x n 1 2 ( x n x n 1 x n 2 ) = 1 4 2 n + 1 2 1 4 2 n x n + 1 3 x n + x n 1 + 2 x n 2 = 0

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