Lawrence–Krammer representation

Template:Short description In mathematics the Lawrence–Krammer representation is a representation of the braid groups. It fits into a family of representations called the Lawrence representations. The first Lawrence representation is the Burau representation and the second is the Lawrence–Krammer representation.

The Lawrence–Krammer representation is named after Ruth Lawrence and Daan Krammer.^[1]

Consider the braid group ${\displaystyle B_n}$ to be the mapping class group of a disc with n marked points, ${\displaystyle P_n}$. The Lawrence–Krammer representation is defined as the action of ${\displaystyle B_n}$ on the homology of a certain covering space of the configuration space ${\displaystyle C_2{P}_n}$. Specifically, the first integral homology group of ${\displaystyle C_2{P}_n}$ is isomorphic to ${\displaystyle {\mathbb{Z}}^{n+1}}$, and the subgroup of ${\displaystyle H_1(C_2{P}_n,\mathbb{Z})}$ invariant under the action of ${\displaystyle B_n}$ is primitive, free abelian, and of rank 2. Generators for this invariant subgroup are denoted by ${\displaystyle q,t}$.

The covering space of ${\displaystyle C_2{P}_n}$ corresponding to the kernel of the projection map

${\displaystyle {\pi }_1(C_2{P}_n)\to {\mathbb{Z}}^2⟨q,t⟩}$

is called the Lawrence–Krammer cover and is denoted ${\displaystyle \overline{C_2{P}_n}}$. Diffeomorphisms of ${\displaystyle P_n}$ act on ${\displaystyle P_n}$, thus also on ${\displaystyle C_2{P}_n}$, moreover they lift uniquely to diffeomorphisms of ${\displaystyle \overline{C_2{P}_n}}$ which restrict to the identity on the co-dimension two boundary stratum (where both points are on the boundary circle). The action of ${\displaystyle B_n}$ on

${\displaystyle H_2(\overline{C_2{P}_n},\mathbb{Z}),}$

thought of as a

${\displaystyle \mathbb{Z}⟨t^{\pm },q^{\pm }⟩}$-module,

is the Lawrence–Krammer representation. The group ${\displaystyle H_2(\overline{C_2{P}_n},\mathbb{Z})}$ is known to be a free ${\displaystyle \mathbb{Z}⟨t^{\pm },q^{\pm }⟩}$-module, of rank ${\displaystyle n(n-1)/2}$.

Using Bigelow's conventions for the Lawrence–Krammer representation, generators for the group ${\displaystyle H_2(\overline{C_2{P}_n},\mathbb{Z})}$ are denoted ${\displaystyle v_{j,k}}$ for ${\displaystyle 1\le j<k\le n}$. Letting ${\displaystyle {\sigma }_i}$ denote the standard Artin generators of the braid group, we obtain the expression:

${\displaystyle {\sigma }_i\cdot v_{j,k}=\{\begin{array}{cc}{v}_{j,k}& i\notin \{j-1,j,k-1,k\},\\ q{v}_{i,k}+(q^2-q)v_{i,j}+(1-q)v_{j,k}& i=j-1\\ v_{j+1,k}& i=j\ne k-1,\\ q{v}_{j,i}+(1-q)v_{j,k}-(q^2-q)t{v}_{i,k}& i=k-1\ne j,\\ v_{j,k+1}& i=k,\\ -t{q}^2{v}_{j,k}& i=j=k-1.\end{array}}$

Stephen Bigelow and Daan Krammer have given independent proofs that the Lawrence–Krammer representation is faithful.

The Lawrence–Krammer representation preserves a non-degenerate sesquilinear form which is known to be negative-definite Hermitian provided ${\displaystyle q,t}$ are specialized to suitable unit complex numbers (q near 1 and t near i). Thus the braid group is a subgroup of the unitary group of square matrices of size ${\displaystyle n(n-1)/2}$. Recently^[2] it has been shown that the image of the Lawrence–Krammer representation is a dense subgroup of the unitary group in this case.

The sesquilinear form has the explicit description:

${\displaystyle ⟨v_{i,j},v_{k,l}⟩=-(1-t)(1+qt)(q-1{)}^2{t}^{-2}{q}^{-3}\{\begin{array}{cc}-q^2{t}^2(q-1)& i=k<j<l\text{ or }i<k<j=l\\ -(q-1)& k=i<l<j\text{ or }k<i<j=l\\ t(q-1)& i<j=k<l\\ q^{2}t(q-1)& k<l=i<j\\ -t(q-1{)}^2(1+qt)& i<k<j<l\\ (q-1{)}^2(1+qt)& k<i<l<j\\ (1-qt)(1+q^{2}t)& k=i,j=l\\ 0& \text{otherwise}\end{array}}$

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