On Whitham's conjecture of a highest cusped wave for a nonlocal dispersive equation

Abstract

We consider the Whitham equation ut + 2u ux+Lux = 0, where L is the nonlocal Fourier multiplier operator given by the symbol m() = /. G. B. Whitham conjectured that for this equation there would be a highest, cusped, travelling-wave solution. We find this wave as a limiting case at the end of the main bifurcation curve of P-periodic solutions, and give several qualitative properties of it, including its optimal C1/2-regularity. An essential part of the proof consists in an analysis of the integral kernel corresponding to the symbol m(), and a following study of the highest wave. In particular, we show that the integral kernel corresponding to the symbol m() is completely monotone, and provide an explicit representation formula for it.