Unique Continuation for Fifth-Order KP Equation and its application to control problems

Abstract

We develop a framework for the fifth-order Kadomtsev--Petviashvili equation on Tx × Ry within a mean-zero KP-adapted Sobolev scale. A localized high-order feedback acting on the periodic variable yields a 5/2--derivative gain in suitable space--time norms, leading to propagation of regularity and a unique continuation property for the linear dynamics. As a consequence, we derive an observability inequality for the adjoint system and establish exponential stabilization of the nonlinear closed-loop equation: for small initial data in Xs,0, s>2, solutions are global and decay exponentially in Xs. Combining observability with the Hilbert Uniqueness Method and a fixed-point argument, we obtain local exact controllability near the origin, with L2 controls supported in the feedback region and cost linear in the data size. The analysis relies on a novel combination of unique continuation, frequency grouping, and the one-sided Fourier vanishing mechanism introduced for the Benjamin--Ono equation by Linares and Rosier in Trans. Amer. Math. Soc. (2015)~LR, here extended to the fifth-order Kadomtsev--Petviashvili equation.