Quasi-monomials with respect to subgroups of the plane affine group

Q3 Mathematics
N. Samaruk
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引用次数: 0

Abstract

Let $H$ be a subgroup of the plane affine group ${\rm Aff}(2)$ considered with the natural action on the vector space of two-variable polynomials. The polynomial family $\{ B_{m,n}(x,y) \}$ is called quasi-monomial with respect to $H$ if the group operators in two different bases $ \{ x^m y^n \} $ and $\{ B_{m,n}(x,y) \}$ have \textit{identical} matrices. We obtain a criterion of quasi-monomiality for the case when the group $H$ is generated by rotations and translations in terms of exponential generating function for the polynomial family $\{ B_{m,n}(x,y) \}$.
关于平面仿射群子群的拟单项式
设$H$是平面仿射群${\rm-Aff}(2)$的一个子群,在二元多项式的向量空间上考虑自然作用。如果两个不同基$\{x^my^n\}$和$\{B_{m,n}(x,y)\}$中的群算子具有相同的矩阵,则多项式族$\{B_{m,n}(x,y)\}$相对于$H$被称为拟单项式。对于多项式族$\{B_{m,n}(x,y)\}$,我们得到了群$H$由指数生成函数的旋转和平移生成的情况下的拟单性准则。
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来源期刊
Matematychni Studii
Matematychni Studii Mathematics-Mathematics (all)
CiteScore
1.00
自引率
0.00%
发文量
38
期刊介绍: Journal is devoted to research in all fields of mathematics.
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