Isotropy group on some topological transformation group structures

D. Keerthana; V. Visalakshi

doi:10.30970/ms.62.1.93-101

D. Keerthana Department of Mathematics, College of Engineering and Technology SRM Institute of Science and Technology SRM Nagar, Kattankulathur-603203, Tamil Nadu, India
V. Visalakshi Department of Mathematics, College of Engineering and Technology SRM Institute of Science and Technology SRM Nagar, Kattankulathur-603203, Tamil Nadu, India

DOI: https://doi.org/10.30970/ms.62.1.93-101

Анотація

This paper explores the topological properties of irresolute topological groups, their quotient maps, and the role of topology in normal subgroups. It provides a detailed analysis\linebreak using examples and counterexamples. The study focuses on the essential features of irresolute topological groups and their quotient groups, for understanding the topological aspects of isotropy groups. For a trans\-for\-ma\-tion group $(\mathsf{H}, \mathsf{Y}, \psi)$ and a point $y \in \mathsf{Y},$ the set

\centerline{$\mathsf{H}_{y} = \{h \in \mathsf{H} \colon hy = y\}$}

\noi consisting of elements of $\mathsf{H}$ that fix $y$, is called the isotropy group at $y$.

The paper highlights the distinct topological characteristics of isotropy groups in transformation group structure. It demonstrates that if $(\mathsf{H}, \mathsf{Y}, \psi)$ is an Irr$^{*}$-topological transformation group, then $( \mathsf{H}/ \mathop{Ker} \psi, \mathsf{Y}, \overline{\psi})$ forms an effective Irr$^{*}$-topological transformation group. By investigating both irresolute topological groups and isotropy groups, the study provides a clear understanding of their topological features. This research improves our understanding of these groups by offering clear examples and counterexamples, leading to a thorough conclusion about their different topological features.

Біографії авторів

D. Keerthana, Department of Mathematics, College of Engineering and Technology SRM Institute of Science and Technology SRM Nagar, Kattankulathur-603203, Tamil Nadu, India

Department of Mathematics, College of Engineering and Technology
SRM Institute of Science and Technology
SRM Nagar, Kattankulathur-603203, Tamil Nadu, India

V. Visalakshi, Department of Mathematics, College of Engineering and Technology SRM Institute of Science and Technology SRM Nagar, Kattankulathur-603203, Tamil Nadu, India

Department of Mathematics, College of Engineering and Technology
SRM Institute of Science and Technology
SRM Nagar, Kattankulathur-603203, Tamil Nadu, India

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