On the Propagation of Regularity of Solutions to the KdV Equation on the positive Half-line

Abstract

We study special regularity properties of solutions to the initial-boundary value problem associated with the Korteweg-de Vries equations posed on the positive half-line. In particular, for initial data u0 ∈ H34+(R+) and boundary data f∈ H32+(+), where the restriction of u0 to some subset of (b,∞) has an extra regularity for any b>0, we prove that the regularity of solutions u moves with infinite speed to its left as time evolves until a certain time T*. The existence of a stopping time T* appears because of the effect of the boundary function f. Also, as a consequence of our proof, we prove a gain in the regularity of the trace derivatives of the solutions for the Korteweg-de Vries on the half-line.

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