I have derived an explicit formula for the [Euler zigzag numbers][1], the number of alternating permutations for n elements:

$A_n = i^{n+1}\sum _{k=1}^{n+1} \sum _{j=0}^k {k\choose{j}} \frac{(-1)^j(k-2j)^{n+1}}{2^ki^kk}$

For details, please refer to my article in [Voofie][2]:

[An Explicit Formula for the Euler zigzag numbers (Up/down numbers) from power series][3]

I would like to ask, if my formula is new, or is it a well known result? Since I can't find it in Wikipedia or MathWorld. If it is an old formula, can anyone give me some reference to it?


  [1]: http://mathworld.wolfram.com/EulerZigzagNumber.html
  [2]: http://www.voofie.com/
  [3]: http://www.voofie.com/content/117/an-explicit-formula-for-the-euler-zigzag-numbers-updown-numbers-from-power-series/