On normal solvability of the Riemann problem with singular coefficient

Rakowski, M.; Spitkovsky, I.

doi:10.1090/S0002-9939-97-03631-9

On normal solvability of the Riemann problem with singular coefficient
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by M. Rakowski and I. Spitkovsky PDF

Proc. Amer. Math. Soc. 125 (1997), 815-826 Request permission

Abstract:

Suppose $G$ is a singular matrix function on a simple, closed, rectifiable contour $\Gamma$. We present a necessary and sufficient condition for normal solvability of the Riemann problem with coefficient $G$ in the case where $G$ admits a spectral (or generalized Wiener-Hopf) factorization $G_{+} \Lambda G_{-}$ with $G_{-}^{\pm 1}$ essentially bounded. The boundedness of $G_{-}^{\pm 1}$ is not required when $G$ takes injective values a.e. on $\Gamma$.

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