Abstract: In 2004, van den Berg, Bolthausen and den Hollander, obtained in a tour de force a Large Deviation Principle for the intersection of two Wiener sausages. However, their result was limited to a finite time window. Nevertheless, they conjectured (and provided strong evidence for this) that the same result should hold in infinite time horizon in case of dimension 3 and higher, when Brownian motion is transient. In a series of recent works with Amine Asselah, we proved this conjecture in the discrete setting, when Brownian motion is replaced by a Simple Random Walk on the Euclidean lattice. In this talk, we will try to explain the main steps of the proof.