Solving partial difference equation

Question

I am trying to solve the following partial difference equation:

$$A_k^{n+1}=(k+1)A_{k+1}^n+(n+2-k)A_{k-1}^n $$

with initial condition:

$$\begin{cases} A_0^0&=1\\ A_1^0&=1 \end{cases}$$

I have tried using generating function method and the detail is given by the following article in Voofie:

Reducing a partial difference equation into a partial differential equation and solving for the generating function using method of characteristics

The generating function I found is:

$$A(x,y)=\left(\sec \left(y\sqrt{1-x^2}+\sin ^{-1}x\right)+\tan \left(y\sqrt{1-x^2}+\sin ^{-1}x\right)\right)\sqrt{1-x^2}$$

if A(x,y) is defined by:

$$A(x,y)=\sum _{n=0}^{\infty } \sum _{k=0}^{\infty } \frac{A_k^n x^k y^n}{n!}$$

Though I have solved the generating function, I still can't solve explicitly the form of $A_k^n$.

Can anyone help me with it? And is there any other approach other than the generating function method?

P.S. If you would like to know where the partial difference equation comes from, please refer to this article:

Finding nth derivative of the function sec x + tan x and partial difference equation

Answer 1

As I'm sure you've noticed, the two recurrences with $n \equiv k \mod 2$ and $n \equiv k+1 \mod 2$ don't interact with each other, so you have two triangular arrays of numbers here.

When $n \equiv k \mod 2$, you are looking at A008971. When $n \equiv k+1 \mod 2$, I don't think this sequence has been seen before.

In any case, I doubt there is a closed form. Your recurrence looks very similar to the Eulerian numbers and there is no closed form for them. But generating functions are very powerful. Whatever you want to know about these numbers may be deduce-able from the generating function.