Risolubilità e ipoellitticità per equazioni differenziali a derivate parziali semilineari con caratteristiche multiple
Solvability for semilinear PDE with multiple characteristics
We prove local solvability in Gevrey spaces for a class of semilinear partial differential equations. The linear part admits characteristics of multiplicity k ≥ 2 and data are fixed in , 1 < σ < k/(k-1). The nonlinearity, containing derivatives of lower order, is assumed of class with respect to all variables.
Hypoellipticity and local solvability of anisotropic PDEs with Gevrey nonlinearity
We propose a unified approach, based on methods from microlocal analysis, for characterizing the hypoellipticity and the local solvability in and Gevrey classes of semilinear anisotropic partial differential operators with Gevrey nonlinear perturbations, in dimension . The conditions for our results are imposed on the sign of the lower order terms of the linear part of the operator, see Theorem 1.1 and Theorem 1.3 below.
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