Uniqueness in the Cauchy problem for quasi-homogeneous operators with partially holomorphic coefficients (Q5937564)

The author studies the uniqueness of the Cauchy problem for operators with partially holomorphic coefficients, \(P= \sum_{|\alpha:\widetilde m|+|\beta;m|\leq 1} a_{\alpha,\beta}D^\alpha_x D^\beta_y\), where \(d:\widetilde m|= \sum^d_{j=1} {\alpha_j\over\widetilde m_j}\), \(|\beta; m|= \sum^n_{j=1} {\alpha_j\over m_j}\). He proved that if the transversal ellipticity (or pricipal normality) and the quasi-homogeneous pseudo-convexity are valid, then the Cauchy problem NEWLINE\[NEWLINEPu= 0,\quad\text{supp }u\subset \{\phi(x, y)\leq \phi(x_0, y_0)\},NEWLINE\]NEWLINE has a neighborhood of \((x_0, y_0)\) in which \(u= 0\), where \(\phi\) defines a initial surface near \((x_0, y_0)\).