What does this series converge to? <munderover> &#x2211;<!-- ∑ --> <mrow class="MJX-TeXA

Kyle Sutton

Kyle Sutton

Answered question

2022-07-04

What does this series converge to?
n = 0 ( γ 2 ) 2 n ( 2 n k 2 + n )

Answer & Explanation

Perman7z

Perman7z

Beginner2022-07-05Added 13 answers

Since k 2 N we have m = k / 2 N . Now consider
S ( x , m ) = n = 0 ( 2 n m + n ) x n .
The binomial coefficient is equal to zero when n < m so
S ( x , m ) = n = m ( 2 n m + n ) x n = x m n = 0 ( 2 n + 2 m n + 2 m ) x n
Let ( s ) n = Γ ( s + n ) / Γ ( s ) be the Pochhammer symbol. We have by the gamma duplication formula and definition of the binomial coefficient:
( 2 n + 2 m n + 2 m ) = Γ ( 2 n + 2 m + 1 ) Γ ( n + 2 m + 1 ) n ! = 2 2 n + 2 m π Γ ( m + 1 / 2 + n ) Γ ( m + 1 + n ) Γ ( n + 2 m + 1 ) n ! = 2 2 m π Γ ( m + 1 / 2 + n ) Γ ( m + 1 + n ) Γ ( 2 m + 1 + n ) 4 n n ! = 2 2 m π Γ ( m + 1 / 2 ) Γ ( m + 1 ) Γ ( 2 m + 1 ) = 1 Γ ( m + 1 / 2 + n ) Γ ( m + 1 + n ) Γ ( 2 m + 1 ) Γ ( m + 1 / 2 ) Γ ( m + 1 ) Γ ( 2 m + 1 + n ) 4 n n ! = ( m + 1 / 2 ) n ( m + 1 ) n ( 2 m + 1 ) n 4 n n !
Substituting this result back into S we have
S ( x , m ) = x m n = 0 ( m + 1 / 2 ) n ( m + 1 ) n ( 2 m + 1 ) n 4 x n n ! .
Finally, we substitute x = γ 2 / 4, m = k / 2, and identify the series S as a hypergeometric function to get
S ( γ 2 / 4 , k / 2 ) = ( γ 2 ) k 2 F 1 ( k + 1 2 , k 2 + 1 k + 1 ; γ 2 ) .
According to this hypergeometric reduction formula, we then simplify our solution to get the final form
n = 0 ( 2 n k / 2 + n ) γ 2 n 2 2 n = γ k 1 γ 2 ( 1 + 1 γ 2 ) k .

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