I'm looking for a reference that would discuss a Stieltjes convolution between a wiener process and a function of bounded variation.  Additionally, I had a question about this sort of convolution.

Is Stieltjes convolution between a function $F(t)$ with bounded variation and a wiener process, $W(t)$ commutative?

if
$F(t) \bigotimes W(t)=\int F(t-x)dW(x)$

then does
$W(t) \bigotimes F(t)= \int W(t-x)dF(x) = F(t) \bigotimes W(t) $?


Additionally, I'd like to evaluate this integral numerically when I have no formula for F, but a list of points ${t_0,t_1,...t_{N-1} }$ and the values of $F(t)$ at those points.  Any references that would point me in this direction would be appreciated.