Invariants of a mapping of a set to the two-dimensional Euclidean space

D. Khadjiev, Gayrat Beshimov, İdris Ören
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Abstract

Let $E_{2}$ be the $2$-dimensional Euclidean space and $T$ be a set such that it has at least two elements. A mapping $\alpha : T\rightarrow E_{2}$ will be called a $T$-figure in $E_{2}$. Let $O(2, R)$ be the group of all orthogonal transformations of $E_{2}$. Put $SO(2, R)=\left\{ g\in O(2, R)|detg=1\right\}$, $MO(2, R)=\left\{F:E_{2}\rightarrow E_{2}\mid Fx=gx+b, g\in O(2,R), b\in E_{2}\right\}$, $MSO(2, R)= \left\{F\in MO(2, R)|detg=1\right\}$. The present paper is devoted to solutions of problems of $G$-equivalence of $T$-figures in $E_{2}$ for groups $G=O(2, R), SO(2, R)$, $MO(2, R)$, $MSO(2, R)$. Complete systems of $G$-invariants of $T$-figures in $E_{2}$ for these groups are obtained. Complete systems of relations between elements of the obtained complete systems of $G$-invariants are given for these groups.
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一个集合到二维欧几里德空间的映射的不变量
设$E_{2}$是$2$维欧几里得空间,$T$是一个集,使得它至少有两个元素。映射$\alpha:T\rightarrowE_{2}$将在$E_{2}$中被称为$T$图形。设$O(2,R)$是$E_{2}$的所有正交变换的群。将$SO(2,R)=\left\{g\放入O(2、R)| detg=1\right\}$,$MO(2,R)=\lft\{F:E_{2}\rightarrow E_{2}\ mid Fx=gx+b,g\放入O(2、R),b\放入E_{。本文研究了群$G=O(2,R),SO(2,R)$,$MO(2,R$,$MSO(2、R)$的$E_{2}$中$T$-图的$G$-等价性问题的解。对于这些群,得到了$E_{2}$中$T$-图的$G$-不变量的完备系统。对于这些群,给出了所得到的$G$-不变量的完备系统的元素之间的关系的完备系统。
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