One has 
$$
\sum\limits_{n=1}^\infty \frac{(-1)^n}{n!}\frac{d^n f(x)}{dx^n}\frac{d^n g(y)}{dy^n}=(exp(-(\frac{d^2}{dxdy}))[f(x)g(y)]-f(x)g(y)
$$ 

the one-parameter corresponding group is $e^{t\frac{d^2}{dxdy}}=\Phi(t)$ acting on bivariate series as the sum you gave is 

$$
\Phi(-1)[f(x)g(y)]-f(x)g(y)
$$ 

$\Phi(t)$ always converges with $t$ formal of $t$ real/complex on entire series. To integrate it, you can begin considering the functions 
$f(x)e^{y}\mapsto f(x+t)e^{y};\  e^xg(y)\mapsto e^{x}g(x+t)$. Hope this helps.