# Weighted Translation Semigroups: Multivariable Case

**Authors:** Geetanjali M. Phatak, V. M. Sholapurkar

arXiv: 1902.01708 · 2020-02-21

## TL;DR

This paper extends the theory of weighted translation semigroups to multivariable settings, developing analytic models, spectral descriptions, and examples in higher dimensions, generalizing previous one-variable work.

## Contribution

It introduces a multivariable generalization of weighted translation semigroups, constructs an analytic model, and explores spectral properties in higher-dimensional spaces.

## Key findings

- Developed a toral analogue of the analytic model.
- Described the spectral picture of multivariable semigroups.
- Provided numerous examples in multi-variable cases.

## Abstract

M. Embry and A. Lambert initiated the study of a weighted translation semigroup $\{S_t\}$ in ${\cal B}(L^2({\mathbb R_+})),$ with a view to explore a continuous analogue of a weighted shift operator. We continued the work, characterized some special types of semigroups and developed an analytic model for the left invertible weighted translation semigroup. The present paper deals with the generalization of the weighted translation semigroup in multi-variable set up. We develop the toral analogue of the analytic model and also describe the spectral picture. We provide many examples of weighted translation semigroups in multi-variable case. Further, we replace the space $L^2({\mathbb R_+})$ by $L^2({\mathbb R_+^d})$ and explore the properties of weighted translation semigroup $\{S_{\bar{t}}\}$ in ${\cal B}(L^2({\mathbb R_+^d})),$ in both one and multi variable cases.

## Full text

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## References

14 references — full list in the complete paper: https://tomesphere.com/paper/1902.01708/full.md

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Source: https://tomesphere.com/paper/1902.01708