Lyndon words

Arun Ram
Department of Mathematics and Statistics
University of Melbourne
Parkville, VIC 3010 Australia
aram@unimelb.edu.au

Last update: 15 March 2013

Lyndon words

The lexicographic order on words is given by $f_1<\cdots <f_r$ and $$u<v\text{if}v=u{v}_2\text{or}\text{if}u=u_1{f}_i{u}_2\text{and}v=u_1{f}_j{v}_2\text{with}{f}_i<f_j.$$ A word is Lyndon if it is smaller than all its proper right factors.

Any word $u$ has a unique factorisation $$u=l_1{l}_2\cdots l_k\text{with}{l}_1\ge l_2\ge \cdots \ge l_k\text{Lyndon.}$$ (see [Lo, Thm 5.1.5] or [Re, Thm 4.9]).

If $\gamma =4{\alpha }_1^{\vee }+{\alpha }_2^{\vee }$, the words in the set ${\Gamma }^{\gamma }$ (displayed in their nonincreasing Lyndon factorisation) are $$f_1{f}_1{f}_1{f}_1{f}_2,\left(f_1{f}_1{f}_1{f}_2\right)\cdot f_1,\left(f_1{f}_1{f}_2\right)\cdot f_1\cdot f_1,\left(f_1{f}_2\right)\cdot f_1\cdot f_1\cdot f_1,\text{and}{f}_2\cdot f_1\cdot f_1\cdot f_1\cdot f_1.$$

A word is good if there is a homogeneous element $a\in U_q{𝔫}^{-}$ such that $g$ is the maximal word appearing in $a$. The following proposition gives a characterisation of good words and good Lyndon words.

[Le, Prop 17, Prop 25] and [LR, Cor 2.5]

1. A word $g$ is good if and only if $$g=l_1\cdots l_k\text{with}{l}_1\ge l_2\ge \cdots \ge l_k\text{good Lyndon words.}$$
2. Let $R^{+}$ be the set of positive roots and let ${ℛ}^{+}$ be the set of good Lyndon words. Then the map $$\begin{array}{rcl}{R}^{+}& \to & {ℛ}^{+}\\ \beta & \mapsto & l\left(\beta \right)\end{array}\text{is a bijection,}$$ where $$l\left(\beta \right)=\max \left\{l\right({\beta }_1\left)l\right({\beta }_2\left)\right|{\beta }_1,{\beta }_2\in R^{+},\beta ={\beta }_1+{\beta }_2,l\left({\beta }_1\right)<l\left({\beta }_2\right)\}$$

References

Notes and References

This page is partially based on joint work with P. Lalonde and A. Kleshchev.

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