Fourier-integral-operator approximation of solutions to first-order hyperbolic pseudodifferential equations I: convergence in Sobolev spaces
Abstract
An approximation Ansatz for the operator solution, U(z',z), of a hyperbolic first-order pseudodifferential equation, z + a(z,x,Dx) with (a) ≥ 0, is constructed as the composition of global Fourier integral operators with complex phases. An estimate of the operator norm in L(H(s),H(s)) of these operators is provided which allows to prove a convergence result for the Ansatz to U(z',z) in some Sobolev space as the number of operators in the composition goes to ∞.
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