Local solvability and hypoellipticity for semilinear anisotropic partial differential equations

de Donno, Giuseppe; Oliaro, Alessandro

doi:10.1090/S0002-9947-03-03275-6

Local solvability and hypoellipticity for semilinear anisotropic partial differential equations
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by Giuseppe de Donno and Alessandro Oliaro PDF

Trans. Amer. Math. Soc. 355 (2003), 3405-3432 Request permission

Abstract:

We propose a unified approach, based on methods from microlocal analysis, for characterizing the local solvability and hypoellipticity in $C^\infty$ and Gevrey $G^\sigma$ classes of $2$-variable semilinear anisotropic partial differential operators with multiple characteristics. The conditions imposed on the lower-order terms of the linear part of the operator are optimal.

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