Smoothness of solutions to the initial-boundary value problem for the telegraph equation on the half-line with a locally summable potential
Abstract
We study solutions to the system utt-uxx+q(x)u=0, x>0,t>0; u|t=0=ut|t=0=0, x>0; u|x=0=g(t), t>0, with a locally summable Hermitian matrix-valued potential q and a C∞-smooth Cn-valued boundary control g vanishing near the origin. We prove that the solution ug(·,T) is a function from W21([0,T]; Cn) and that the control operator WT:g ug(·,T) is an isomorphism in L2([0,T]; Cn), and, in the case that q is from L2([0,T]; Cn), also an isomorphism in H2([0,T]; Cn).
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