The Benjamin-Ono equation in the zero-dispersion limit for rational initial data: generation of dispersive shock waves
Abstract
The leading-order asymptotic behavior of the solution of the Cauchy initial-value problem for the Benjamin-Ono equation in L2(R) is obtained explicitly for generic rational initial data u0. An explicit asymptotic wave profile uZD(t,x;ε) is given, in terms of the branches of the multivalued solution of the inviscid Burgers equation with initial data u0, such that the solution u(t,x;ε) of the Benjamin-Ono equation with dispersion parameter ε>0 and initial data u0 satisfies u(t,x;ε)-uZD(t,x;ε) 0 in the locally uniform sense as ε 0, provided a discriminant inequality holds implying that certain caustic curves in the (t,x)-plane are avoided. In some cases this convergence implies strong L2(R) convergence. The asymptotic profile uZD(t,x;ε) is consistent with the modulated multi-phase wave solutions described by Dobrokhotov and Krichever.
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