The $C^*$-algebra of the group $N_{7}.$

TL;DR

This paper explicitly characterizes the $C^*$-algebra of a seven-dimensional nilpotent Lie group, describing its spectrum topology and employing Fourier transform techniques to analyze its structure.

Contribution

It provides the first explicit characterization of the $C^*$-algebra for this specific nilpotent Lie group, including spectrum topology and operator field conditions.

Findings

Spectrum topology described explicitly.

Operator-valued Fourier transform applied.

Conditions for algebra elements established.

Abstract

In this paper, the $C^*$-algebra of the seven-dimensional un-decomposable nilpotent Lie group is characterized explicitly for the first time(see \cite{chin}). Furthermore, the topology of its spectrum is described as a preparation for the analysis of its $C^*$-algebra. Then, the operator-valued Fourier transform is employed to translate the given C*-algebra into the algebra of bounded operator fields through its spectrum. We find the conditions satisfied by the image of the goal to characterize them by these conditions, namely the "norm controlled dual limit" (NCDL)-conditions (see \cite{Lud-Reg}). The methods used for the nilpotent Lie groups are different for each. We consider the co-adjoint orbits and for our case, we use the Kirillov theory.