Uniqueness of Conservative Solutions to the Camassa-Holm Equation via Characteristics
Abstract
The paper provides a direct proof the uniqueness of solutions to the Camassa-Holm equation, based on characteristics. Given a conservative solution u=u(t,x), an equation is introduced which singles out a unique characteristic curve through each initial point. By studying the evolution of the quantities u and v= 2 ux along each characteristic, it is proved that the Cauchy problem with general initial data u0∈ H1(R) has a unique solution, globally in time.
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