Growth property and slowly increasing behaviour of singular solutions of linear partial differential equations in the complex domain

被引：5

作者：

Ouchi, S ^{[1
]}

机构：

[1] Sophia Univ, Dept Math, Chiyoda Ku, Tokyo 1028554, Japan

来源：

JOURNAL OF THE MATHEMATICAL SOCIETY OF JAPAN | 2000年 / 52卷 / 04期

关键词：

singular solutions; complex partial differential equations;

D O I：

10.2969/jmsj/05240767

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

Consider a linear partial differential equation in Cd+1 P(z,partial derivative )u(z) = f(z), where u(z) and f(z) admit singularities on the surface {z(0) = 0}. We assume that \f(z)\ less than or equal to A\z(0)\(c) in Some sectorial region with respect to to. We can give an exponent gamma* >0 for each operator P(z,partial derivative) and show for those satisfying some conditions that if For All epsilon > 0 There ExistsC(epsilon) such that \u(z)\ less than or equal to C-z exp(epsilon \z(0)\(-gamma*)) in the sectorial region, then \u(z)\ less than or equal to C\z(0)\(c') for some constants c' and C.

引用

页码：767 / 792

页数：26

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