P¨ aiv¨ arinta, Analytic methods for inverse scattering theory, New Analytic and Geometric Methods in Inverse Problems, 165–185, Springer, Berlin

· 2004

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Well-Posedness of the Helmholtz Equation with Rough Coefficients

math.AP · 2026-04-01 · unverdicted · novelty 6.0

Helmholtz equation with rough compactly supported coefficients is well-posed in Lp under sharp regularity assumptions via paraproduct calculus and rescaled Lippmann-Schwinger formulation.

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Well-Posedness of the Helmholtz Equation with Rough Coefficients math.AP · 2026-04-01 · unverdicted · none · ref 17
Helmholtz equation with rough compactly supported coefficients is well-posed in Lp under sharp regularity assumptions via paraproduct calculus and rescaled Lippmann-Schwinger formulation.

P¨ aiv¨ arinta, Analytic methods for inverse scattering theory, New Analytic and Geometric Methods in Inverse Problems, 165–185, Springer, Berlin

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