# How to recognize a Leonard pair

**Authors:** Edward Hanson

arXiv: 1901.10659 · 2019-01-31

## TL;DR

This paper characterizes Leonard pairs, which are pairs of linear transformations with specific tridiagonal and diagonal matrix representations, providing two new criteria based on intersection numbers and dual eigenvalues.

## Contribution

The paper introduces two new characterizations of Leonard pairs focusing on different parameter sets, enhancing understanding of their structure.

## Key findings

- Provides criteria based on intersection numbers and dual eigenvalues
- Characterizes Leonard pairs using two distinct parameter-focused conditions
- Enhances the theoretical framework for identifying Leonard pairs

## Abstract

Let $V$ denote a vector space with finite positive dimension. We consider an ordered pair of linear transformations $A: V\rightarrow V$ and $A^{*}: V\rightarrow V$ that satisfy (i) and (ii) below.   (i) There exists a basis for $V$ with respect to which the matrix representing $A$ is irreducible tridiagonal and the matrix representing $A^{*}$ is diagonal.   (ii) There exists a basis for $V$ with respect to which the matrix representing $A^{*}$ is irreducible tridiagonal and the matrix representing $A$ is diagonal.   We call such a pair a Leonard pair on $V$. In the literature, there are some parameters that are used to describe Leonard pairs called the intersection numbers $\{a_{i}\}_{i=0}^{d}$, $\{b_{i}\}_{i=0}^{d-1}$, $\{c_{i}\}_{i=1}^{d}$, and the dual eigenvalues $\{\theta^{*}_{i}\}_{i=0}^{d}$. In this paper, we provide two characterizations of Leonard pairs. For the first characterization, the focus is on the $\{a_{i}\}_{i=0}^{d}$ and $\{\theta^{*}_{i}\}_{i=0}^{d}$. For the second characterization, the focus is on the $\{b_{i}\}_{i=0}^{d-1}$, $\{c_{i}\}_{i=1}^{d}$, and $\{\theta^{*}_{i}\}_{i=0}^{d}$.

## Full text

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## References

14 references — full list in the complete paper: https://tomesphere.com/paper/1901.10659/full.md

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Source: https://tomesphere.com/paper/1901.10659