Skip to main content
Hjalmar Rosengren's user avatar
Hjalmar Rosengren's user avatar
Hjalmar Rosengren's user avatar
Hjalmar Rosengren
  • Member for 13 years, 7 months
  • Last seen more than a week ago
15 votes

Computing hypergeometric function at 1

13 votes

Identity involving Pochhammer symbol

9 votes

How to calculate the infinite sum of this double series?

8 votes
Accepted

Plane partitions not containing (1,1,1)

8 votes
Accepted

Generating function of product of binomial coefficients

7 votes
Accepted

Expressions involving $q$-binomial coefficients?

6 votes

How to re-expand the sum of Schur function?

6 votes
Accepted

Identity involving a quadratic term inside the Pochhammer symbol

5 votes
Accepted

Relations of eisenstein series with eta quotient

5 votes

Is there a closed form for this hypergeometric expression?

5 votes

A hypergeometric puzzle

5 votes
Accepted

Is this infinite series related to some well-known special functions?

4 votes

Uses of Divergent Series and their summation-values in mathematics?

4 votes

An equality between $\pi$ and $\Gamma$ function

3 votes

Groups, quantum groups and (fill in the blank)

3 votes

6-j symbols and hypergeometric series

3 votes

Integral of $I = \int_{a}^{\infty}dx \frac{x^s}{(1+x)^{n}}$

2 votes

Computation of the pfaffian of a particular matrix

2 votes
Accepted

How to show the following inequality $_2F_1(5.5, 1, 5;-|x|^2]>0$?

2 votes
Accepted

Looking for some special functions

2 votes

Generating function of the square of Jacobi polynomial

2 votes
Accepted

Modulo $2$ binomial transform of A243499 applied $k$ times

1 vote
Accepted

Recursive formula from given explicit formula for normalized Chebyshev polynomials

1 vote

Estimates for the absolute value of the hypergeometric function ${}_2F_1(2-n,n+2,2;x)$ on $[0,1]$

1 vote
Accepted

Where is the source of the formula $\sum_{j=0}^\infty \bigl(j+\frac{1}{2}\bigr)^{n-1}\frac{2^{j+1/2}}{\binom{2j+1}{j+1/2}}$ for an integer sequence?

1 vote

Hyper geometric series reference

0 votes

A certain sum with q by the power of binomial (n 2)