Lamplighter group explained

Z₂\wrZ

Introduction

The name of the group comes from viewing the group as acting on a doubly infinite sequence of street lamps

...,l_-2,l_-1,l_0,l_1,l_2,l_3,...

each of which may be on or off, and a lamplighter standing at some lamp

l_k.

An equivalent description for this, called the base group

	infty
B=oplus
	-infty

Z_2,

Z₂

where

corresponds to a light that is off and

corresponds to a light that is on, and the direct sum is used to ensure that only finitely many lights are on at once. An element of

gives the position of the lamplighter, and

to encode which bulbs are illuminated.

There are two generators for the group: the generator t increments k, so that the lamplighter moves to the next lamp (t^-1 decrements k), while the generator a means that the state of lamp l_k is changed (from off to on or from on to off). Group multiplication is done by "following" these operations.

We may assume that only finitely many lamps are lit at any time, since the action of any element of L changes at most finitely many lamps. The number of lamps lit is, however, unbounded. The group action is thus similar to the action of a Turing machine in two ways. The Turing machine has unbounded memory, but has only used a finite amount of memory at any given time. Moreover, the Turing machine's head is analogous to the lamplighter.

Presentation

The standard presentation for the lamplighter group arises from the wreath product structure

\langlea,t\mida^2,[t^mat^-m,tⁿat^-n],m,n\inZ\rangle

, which may be simplified to

\langlea,t\mida^2,(atⁿat^-n)^2,n\inZ\rangle

The growth rate of the group, the function describing the number of group elements that can be formed as a product of

generators for each

, is generally defined with respect to these two generators

and

. This is exponential, with the golden ratio as its base, the same rate as the growth of the Fibonacci numbers.^[1] In some cases the growth rate is studied with respect to two different generators

and

, changing the logarithm of the growth rate by at most a factor of 2.

This presentation is not finite. It has infinitely many relations, as specified by the indices

and

. In fact there is no finite presentation for the lamplighter group, that is, it is not finitely presented.

Matrix representation

Allowing

to be a formal variable, the lamplighter group

is isomorphic to the group of matrices

\begin{pmatrix}t^k&p\ 0&1\end{pmatrix},

where

k\inZ

and

ranges over all polynomials in

	-1
Z
	2[t,t

^[2]

Using the presentations above, the isomorphism is given by

\begin{align} t&\mapsto\begin{pmatrix}t&0\ 0&1\end{pmatrix}\\ a&\mapsto\begin{pmatrix}1&1\ 0&1\end{pmatrix}. \end{align}

Generalizations

One can also define lamplighter groups

L_n=Z_n\wrZ

, with

n\inN

, so that "lamps" may have more than just the option of "off" and "on." The classical lamplighter group is recovered when

n=2.

Notes and References

Book: Bartholdi, Laurent . Ceccherini-Silberstein . Tullio . Salvatori . Maura . Sava-Huss . Ecaterina . 1512.07044 . Growth of groups and wreath products . 978-1-316-60440-3 . 3644003 . 1–76 . Cambridge Univ. Press . London Mathematical Society Lecture Note Series . Groups, graphs and random walks: Selected papers from the workshop held in Cortona, June 2–6, 2014 . 436 . 2017. See appendix C.2.
Book: Office Hours with a Geometric Group Theorist. 2017-07-11. Princeton University Press. 9780691158662. Clay. Matt. Princeton, NJ Oxford. English. Margalit. Dan. Dan Margalit (mathematician).