It is known that
$$\int_ 0^{\infty}\frac {e^{-x - \frac {1} {x}}} {x}\, dx=2 K_0(2)$$,
,but now I want to got the closed form approximate result of 
$$\int_ 0^a\frac {e^{-x - \frac {1} {x}}} {x}\, dx$$,
I have searched the classic Table of Integrals, Series, and Products, but there is no pattern match this situation.
Is there some approaches to the problem?