Wigner transform & convolution

I’m trying to understand the gradient expansion within the Keldysh formalism. In particular, I am reading "Quantum Field Theory of Non-equilibrium States" by J. Rammer, section 7.2, regarding Wigner or mixed coordinates. There, in Eq. (7.23), the author presents the Wigner transform of a convolution,

$$(Aotimes B)(x,k)equiv int d^4r e^{ikcdot r}int d^4w A(u,w)B(w,v)=e^{(i/2)(partial_x^Apartial_k^B-partial_k^Apartial_x^B)}A(x,k)B(x,k),tag{1}$$

where $x=(u+v)/2$ and $r=u-v$. A similar result can be found in this reference, Eq. (2.52).

The proof provided by Rammer considers the convolution
$$C(u,v)=int d^4w A(u,w)B(w,v)=int d^4w A(x+r/2,w)B(w,x-r/2)equiv C(x,r).tag{2}$$

Rewriting Eq. (2) in mixed coordinates,
$$C(x,r)=int d^4w Aleft(frac{x+r/2+w}{2},x+r/2-wright)Bleft(frac{w+x-r/2}{2},w-x+r/2right),tag{3}$$

Shifting the $w-$integral in Eq. (3) gives
$$C(x,r)=int d^4w A(x+w/2,r-w)B(x-r/2+w/2,w).tag{4}$$

After Wigner transforming the last expression, one ends up with
$$begin{align}C(x,k)=&int d^4r e^{ikcdot r}int d^4w A(x+w/2,r-w)B(x-r/2+w/2,w),tag{5}
=&int d^4r e^{ikcdot r}int d^4w intfrac{d^4k’}{(2pi)^4}e^{-ik’cdot(r-w)}A(x+w/2,k’)
&intfrac{d^4k”}{(2pi)^4}e^{-ik”cdot w}B(x-r/2+w/2,k”).tag{6}end{align}$$

Apparently, the argument to proceed from Eq. (6) to get Eq. (1) relies on a Taylor expansion and partial integrations, but I have not been able to complete the proof.

Suggestions to complete the missing steps are very welcomed.