How to compute the following integral?
$$\int_{\|x\|^2\leq R} \exp(-x^\ast G x+2\mathcal{Re}(x^\ast a)) \,dx,$$ where $x$ is an $M \times 1$ vector ($M\gg 1$), $G$ is a positive definite matrix, and $a$ is an arbitrary vector.
This does not seem to be an instance of the Itzykson Zuber integral.
I propose to diagonalize the matrix $G$, making a change of variables by an orthogonal matrix, and next separe the variables; I am reduced so to calculate: $$ \int_{|x| \leq r} \exp ( a x^2 + bx) dx $$ but I have no real calculus for such integrals except if $r=+\infty$ because: $$ \int_{\mathbb R} \exp(-\pi x^2) dx =1 $$
