Existence of hyperbolic blow-up to the generalized quasi-geostrophic equation

Abstract

In this work, we investigate the blow-up of solutions to the generalized surface quasi-geostrophic (gSQG) equation in R2, within the more singular range β∈(1,2) for the coupling of the velocity field. This behavior is studied under a hyperbolic setting based on the framework originally introduced by C\'ordoba (1998, Annals of Math. 148, 1135--52) for the classical SQG equation. Assuming that the level sets of the solution contains a hyperbolic saddle, and under suitable conditions on the solution at the origin, we obtain the existence of a time T∈R+\∞\ at which the opening angle of the saddle collapses. Moreover, we derive a lower bound for the blow-up time T. This geometric degeneration leads to the blow-up of the H\"older norm θ(t)Cσ as t→ T, for σ∈(0, β -1), showing the formation of singularity in the H\"older space at time T. To the best of our knowledge, these are the first results in the literature to rigorously prove the formation of a singularity, whether in finite or infinite time, for a class of smooth solutions to the gSQG equation.