The zero-dispersion limit for the Benjamin--Ono equation on the circle

Abstract

Using the explicit formula of P. G\'erard, we characterize the zero-dispersion limit for solutions of the Benjamin--Ono equation on the circle T= R/2πZ with bounded initial data u0∈ L∞(T,R). The result generalizes the work of L. Gassot, who focused on periodic bell-shaped data, and complements the work of G\'erard and X. Chen who identified the zero-dispersion limit on the line with u0∈ L2 L∞(R). Here, as well as in the mentioned cases, the characterization agrees with the one first obtained by Miller--Xu for bell-shaped data on the line: The zero-dispersion limit is given as an alternating sum of the branches of the multivalued solution of Burgers' equation. From this characterization, we compute regularity properties of the zero-dispersion limit, including maximum principles and an Oleinik estimate.