Two-Front Solutions of the SQG Equation and its Generalizations

Abstract

The generalized surface quasi-geostrophic (GSQG) equations are transport equations for an active scalar that depend on a parameter 0<α 2. Special cases are the two-dimensional incompressible Euler equations (α = 2) and the surface quasi-geostrophic (SQG) equations (α = 1). We derive contour-dynamics equations for a class of two-front solutions of the GSQG equations when the fronts are a graph. Scalar reductions of these equations include ones that describe a single front in the presence of a rigid, flat boundary. We use the contour dynamics equations to determine the linearized stability of the GSQG shear flows that correspond to two flat fronts. We also prove local-in-time existence and uniqueness for large, smooth solutions of the two-front equations in the parameter regime 1<α 2, and small, smooth solutions in the parameter regime 0<α 1.