On Almost Hypoelliptic Polynomials Increasing at Infinity

H. G. Ghazaryan

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On Almost Hypoelliptic Polynomials Increasing at Infinity

机译：关于无穷大的几乎次椭圆多项式

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摘要

It is proved that a polynomial (the symbol of a differential operator), the Newton polygon of which is a rectangular parallelepiped with a vertex at the origin, is almost hypoelliptic if and only if it is regular. Also some algebraic conditions of almost hypoellipticity are obtained for nonregular polynomials increasing at infinity. The results are unimprovable for polynomials of two variables.

机译：证明了多项式（微分算子的符号），其牛顿多边形是一个以顶点为原点的长方体，当且仅当它是规则的时，它几乎是椭圆的。对于无穷大的非正则多项式，也获得了几乎为椭圆度的一些代数条件。对于两个变量的多项式，结果是不可改进的。

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来源
《Journal of Contemporary Mathematical Analysis》 |2011年第6期|p.313-325|共13页
作者
H. G. Ghazaryan;
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作者单位

Russian-Armenian (Slavonic) University, Yerevan, Armenia,Yerevan State University;

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正文语种 eng
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关键词
almost hypoelliptic polynomial; regular polynomial; hypoelliptic operator (polynomial); newton polyhedron;

机译：几乎次椭圆多项式;正则多项式次椭圆算子（多项式）;牛顿多面体;

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On Almost Hypoelliptic Polynomials Increasing at Infinity

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