Smoothing effect and Fredholm property for first-order hyperbolic PDEs
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We give an exposition of recent results on regularity and Fredholm properties for first-order one-dimensional hyperbolic PDEs. We show that large classes of boundary operators cause an effect that smoothness increases with time. This property is the key in finding regularizers (parametrices) for hyperbolic problems. We construct regularizers for periodic problems for dissipative first-order linear hyperbolic PDEs and show that these problems are modeled by Fredholm operators of index zero.
💡 Research Summary
The paper provides a comprehensive study of regularity and Fredholm properties for first‑order one‑dimensional hyperbolic partial differential equations. The authors consider the linear system
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