有限循环对称群光滑函数奇异性的分类

IF 1.7 3区 物理与天体物理 Q2 PHYSICS, MATHEMATICAL
E. A. Kudryavtseva, M. V. Onufrienko
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引用次数: 0

摘要

本文研究了在有限群\(G\)的旋转作用下,二元不变光滑函数的奇异性。得到了不超过两个参数的\(G\)不变光滑函数的典型参数族中出现的临界点的一种分类,当\(|G|\ne4\)。当函数的阶次为\(|G|\)的泰勒多项式不是\(x^2+y^2\)的多项式,并且奇异点的Milnor \(G\) -多重性(分别为\(G\) -协维)小于\(|G|\)(分别为\(|G|/2\))时,获得了光滑\(G\) -不变函数到范式的可约性判据(通过\(G\) -等变变量变换)。得到了光滑参数族\(G\)不变函数在其临界点附近可约为正规的一个判据。判据是用函数在临界点处的偏导数来表示的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Classification of Singularities of Smooth Functions with a Finite Cyclic Symmetry Group

Classification of Singularities of Smooth Functions with a Finite Cyclic Symmetry Group

In the paper, we study the singularities of smooth functions of two variables that are invariant under the action of a finite group \(G\) acting by rotations. A classification is obtained for critical points arising in typical parametric families of \(G\)-invariant smooth functions with at most two parameters, when \(|G|\ne4\). A criterion is obtained for the reducibility of a smooth \(G\)-invariant function to a normal form (by means of a \(G\)-equivariant change of variables) when the Taylor polynomial of degree \(|G|\) of the function is not a polynomial in \(x^2+y^2\) and the Milnor \(G\)-multiplicity (the \(G\)-codimension, respectively) of the singularity is less than \(|G|\) (than \(|G|/2\), respectively). A criterion is obtained for the reducibility of a smooth parametric family of \(G\)-invariant functions to a normal form near the critical point of the type in question. The criteria are given in terms of partial derivatives of the function at the critical point.

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来源期刊
Russian Journal of Mathematical Physics
Russian Journal of Mathematical Physics 物理-物理:数学物理
CiteScore
3.10
自引率
14.30%
发文量
30
审稿时长
>12 weeks
期刊介绍: Russian Journal of Mathematical Physics is a peer-reviewed periodical that deals with the full range of topics subsumed by that discipline, which lies at the foundation of much of contemporary science. Thus, in addition to mathematical physics per se, the journal coverage includes, but is not limited to, functional analysis, linear and nonlinear partial differential equations, algebras, quantization, quantum field theory, modern differential and algebraic geometry and topology, representations of Lie groups, calculus of variations, asymptotic methods, random process theory, dynamical systems, and control theory.
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