[No](http://en.wikipedia.org/wiki/Liouville's_theorem_(differential_algebra)), there is [no](http://en.wikipedia.org/wiki/Risch_algorithm) closed form. However, $\displaystyle\int^\infty_0 e^{-a x^2} \cosh (bx)dx=\frac12\exp\bigg(\frac{b^2}{4a}\bigg)\sqrt\frac\pi a~$ should make for a decent lower limit. Though, depending on the ratio between *a* to *b*, its value can be up to several $/$ many times smaller than that of the original. In any case, asymptotic approximation seems to be the way to go, perhaps by adding a second approximating function for the integrand, for small values of *x*, since the one mentioned above works better for larger values of the variable, as $x\to\infty$. Hope this helps.