Quadratic lifespan for the sublinear $α$-SQG sharp front problem

In this paper we consider the generalized surface quasi-geostrophic $α$-SQG equations, in the "sublinear regime" $α\in (0, 1)$ and we study the stability of vortex patches close to vortex discs. We shall prove that for regular, Sobolev initial vortex patches $\varepsilon$-close to a vortex disc, the solutions stay $\varepsilon$-close to a vortex disc for a time interval of order $O(\varepsilon^{- 2})$. The proof is based on a paradifferential Birkhoff normal form reduction, implemented in the case where the dispersion relation is sublinear.