This paper deals with quasilinear weakly hyperbolic equations satisfying the Levi condition. The authors introduce in the quasi-linear case the notions of weakly hyperbolic equation of constant multiplicity, Levi's condition and domain of influence. The solution $u$ of the corresponding equation is assumed to be real-valued and to belong to $C^\infty(\Omega)$, while the equation depends analytically on $(y,u^{(\beta)}(y)), y\in\Omega$. According to the main result of this paper, analyticity propagates across an analytic hypersurface $S_0$ into the domain of influence based on $S_0$. This paper is a continuation of some previous investigations of the same authors.
Quasilinear weakly hyperbolic equations with Levi's conditions
ZANGHIRATI, Luisa
1997
Abstract
This paper deals with quasilinear weakly hyperbolic equations satisfying the Levi condition. The authors introduce in the quasi-linear case the notions of weakly hyperbolic equation of constant multiplicity, Levi's condition and domain of influence. The solution $u$ of the corresponding equation is assumed to be real-valued and to belong to $C^\infty(\Omega)$, while the equation depends analytically on $(y,u^{(\beta)}(y)), y\in\Omega$. According to the main result of this paper, analyticity propagates across an analytic hypersurface $S_0$ into the domain of influence based on $S_0$. This paper is a continuation of some previous investigations of the same authors.I documenti in SFERA sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
