The Modified Energy Method for Quasilinear Wave Equations of Kirchhoff Type

Abstract

In this paper, we use the modified energy method of Hunter, Ifrim, Tataru, and Wongto prove an improved quintic energy estimate for initial data small in H1x × L2x for a wide class of quasilinear wave equations of Kirchhoff type. This allows us to make the first steps towards small data H5/4x × H1/4x local well-posedness. In particular, we prove an enhanced lifespan for corresponding solutions depending only on the H5/4x × H1/4x norm of the initial data as well as the existence of weak solutions for H5/4x × H1/4x initial data, again small in H1x × L2x. In contrast to previous modified energy results, the nonlinearity in these models depends on an H1x norm of the solution. This means a modified energy cannot be deduced algebraically by analyzing resonant interactions between wave packets since all spatial dependence is integrated out in the nonlinearity. Instead, the modified energy is determined as a Taylor series of incremental leading order terms.