Deducing Inequality from an Equation I was interested in Solution of this Non-Homogenous Recurrence

Noah Dominguez

Noah Dominguez

Answered question

2022-06-04

Deducing Inequality from an Equation
I was interested in Solution of this Non-Homogenous Recurrence Relation
f ( n ) = f ( n 1 ) + f ( n 3 ) + 1
The Base conditions are:
f ( 0 ) = 1
f ( 1 ) = 2
f ( 2 ) = 3
Since, the equation is non-homogenous, it will consists of Two Parts.
- Finding solution of Associated Homogenous Recurrence Relation f ( n ) = f ( n 1 ) + f ( n 3 )
For this the characteristic equation will be x 3 x 2 1 = 0
- Finding Particular Solution
one can find answer by inputting f ( n ) = f ( n 1 ) + f ( n 3 ) + 1 , f ( 0 ) = 1 , f ( 1 ) = 2 , f ( 2 ) = 3
The solution is quite complex. Thus, I was interested if we can deduce that f ( n ) x n for some x ϵ R .

Answer & Explanation

Pettanicej4lyy

Pettanicej4lyy

Beginner2022-06-05Added 4 answers

Step 1
First all, let f n = g n 1 to make
g n = g n 1 + g n 3 with g 0 = 2 , g 1 = 3 , g 2 = 4
The real solution of r 3 = r 2 + 1 is given by
r 1 = 1 3 ( 1 + 2 cosh ( 1 3 cosh 1 ( 29 2 ) ) )
Write r 3 r 2 1 = ( r r 1 ) ( r 2 + a r + b )
to get a = 2 3 ( cosh ( 1 3 cosh 1 ( 29 2 ) ) 1 ) and b = 3 1 + 2 cosh ( 1 3 cosh 1 ( 29 2 ) )
Step 2
So, solving the quadratic r 2 + a r + b = 0, you have the complex roots r 2 and r 3 .
Now, use the conditions to get ( c 1 , c 2 , c 3 ) and I suppose that this will again involve a cubic equation with only one real root to generate real value of g n and f n .
It could probably be easier to identify the generating function which is not very complex.
In view of the numbers f ( n ) > [ 2 ] n

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