We consider a Poisson point process on \(\mathbb R ^d\) with intensity \(\lambda\) for \(d\ge2\). On each point, we independently center a ball whose radius is distributed according to some power-law distribution \(\mu\). When the distribution \(\mu\) has a finite \(d\)-moment, there exists a non-trivial phase transition in \(\lambda\) associated to the existence of an infinite connected component of balls. We aim here to prove subcritical sharpness that is that the subcritical regime behaves well in some sense. For distribution \(\mu\) with a finite \(5d−3\)-moment, Duminil-Copin--Raoufi--Tassion proved subcritical sharpness using randomized algorithm. We prove here using different methods that the subcritical regime is sharp for all but a countable number of power-law distributions. Joint work with Vincent Tassion.