Unconditional Uniqueness of 5th Order KP Equations

Abstract

In this paper we study the 5th Order Kadomstev-Petviashvili (KP) equations posed on the real line. In particular we adapt the energy estimate argument from Guo-Molinet (arXiv:2404.12364v1 [math.AP]) to conclude unconditional uniqueness of the solution to data map for 5th order KP type equations. Applying short-time Xs,b methods to improve classical energy estimates provides more than sufficient decay when considering estimates on the interior of the time interval [0,T]. The issue is how we deal with the boundary. By abusing symmetry we can apply multilinear interpolation to gain access to L4 Strichartz estimates, which provide improved derivative gain. When taken together, the regularity of our resultant function space can be arbitrarily close to L2, which in the context of unconditional uniqueness results is almost sharp.