A Class of Lie 2-Algebras in Higher-Order Courant Algebroids

Abstract

In this paper, we study the relation of the algebraic properties of the higher-order Courant bracket and Dorfman bracket on the direct sum bundle TMpT*M for an m-dimensional smooth manifold M, and a Lie 2-algebra which is a categorified version of a Lie algebra. We prove that the higher-order Courant algebroids give rise to a semistrict Lie 2-algebra, and we prove that the higher-order Dorfman algebroids give rise to a hemistrict Lie 2-algebra. Consequently, there is an isomorphism from the higher-order Courant algebroids to the higher-order Dorfman algebroids as Lie 2-algebras homomorphism.

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Bi, Y. , Han, F. and Sun, M. (2016) A Class of Lie 2-Algebras in Higher-Order Courant Algebroids. Journal of Applied Mathematics and Physics, 4, 1254-1259. doi: 10.4236/jamp.2016.47131.

1. Introduction

The notion of Courant algebroid was introduced in [1] to study the double of Lie bialgebroids. Equivalent definition was given by Roytenberg [2]. In resent years, with the development and exploration of the theory of categorified Lie algebras, or “Lie 2-algebras”, Courant algebroids have been far and wide studied from several aspects and have been found many applications in the theory of Manin pairs and moment maps [3] [4]; generalized complex structures [5]; -algebras and symplectic supermanifolds [2]; gerbes [6] as well as BV algebras and topological field theories.

But these articles just introduced the Courant algebroids and Dorfman algebroids. And they did not find the relation between the higher-order Courant algebroids and the higher-order Dorfman algebroids.

The standard Courant algebroid is the direct sum bundle. The standard Courant bracket is given by

(1)

However, many experts know that on the direct sum bundle, there is also a similar bracket operation, i.e.

which we call the higher-order Courant bracket. We have proved that the Jacobi identity holds up to an exact term.

So in our paper, we introduce the higher-order Courant algebroids and Dorfman algebroids, and find their relation. In Section 2, we review the higher-order Courant bracket and higher-order Courant Dorfman bracket. Also we review the basic definitions about the Dorfman algebroids and Lie 2-algebras. In Section 3, we intro- duce emphatically the equivalence between the higher-order Courant algebroids and higher-order Dorfman algebroids. In Thm. 3.1, we construct a Lie 2-algebra which is “semistrict”, meaning that the bracket is skew- symmetric, but the Jacobi identity holds only up to isomorphism, where the Lie bracket of observables is given instead by the higher-order Courant bracket. In Thm. 3.2, we construct another Lie 2-algebra with the same objects and morphisms, where the Lie bracket of observables is given instead by the higher-order Dorfman bracket. In Thm. 3.3, we show that these two Lie 2-algebras are isomorphic.

2. Preliminaries

In this section, we introduce the higher-order Courant and Dorfman bracket on the direct sum bundle and associated properties. Also we review the definition of Lie 2-algebras.

First, there is a natural -valued nondegenerate symmetric pairing on the direct sum bundle,

(2)

The higher-order Courant bracket satisfies some similar properties as the Courant bracket.

Theorem 2.1. [7] For any we have

1) where is defined by

2)

3)

4)

Second, we introduce the following higher-order Dorfman bracket,

(3)

The higher-order Dorfman bracket also satisfies similar properties as the usual Dorfman bracket.

Theorem 2.2. [7] 1) For any we have

2) The Dorfman bracket is a Leibniz bracket, i.e. for any

Consequently, is a Dorfman algebroid.

3) The pairing (2) and the higher-order Dorfman bracket is compatible in the following sense,

(4)

Third, we review some definitions about the Lie 2-algebra.

Definition 2.3. [8] A Lie 2-algebra is a 2-term chain complex of vector spaces equipped with the following structure:

1) A chain map which called the bracket;

2) A chain homotopy which called the alternator;

3) An antisymmetric chain homotopy which called the Jacobiator.

In addition, the following diagrams are required to commute:

Definition 2.4. [8] A Lie 2-algebra for which the Jacobiator is the identity chain homotopy is called hemistrict. One for which the alternator is the identity chain homotopy is called semistrict.

Definition 2.5. [8] Given Lie 2-algebras L and with bracket, alternator and Jacobiator and respectively, a homomorphism from L to consists of:

1) A Chain map and

2) A chain homotopy

such that the following diagrams commute:

3. The Equivalence between p-Order Courant Algebroid and p-Order Dorfman Algebroid

In this section, we construct a “semistrict” Lie 2-algebra and a “hemistric” Lie 2-algebra and give the relation between p-order Courant algebroids and p-order Dorfman algebroids. We all know that is a p- order Courant algebroid, and is a p-order Dorfman algebroid. We shall construct two Lie 2- algebras associated to: one hemistrict and one semistrict. Then we shall prove these are isomorphic. Both these Lie 2-algebras have the same underlying 2-term complex, namely:

where d is the usual exterior derivative of functions. To see that this chain complex is well-defined.

We make L into a semistrict Lie 2-algebra. For this, we use a chain map called the semi-bracket: In degree 0, the semi-bracket is given as in Equation (1)

In degrees 1 and 2, we set it equal to zero:

Theorem 3.1. is a p-order Courant algebroid, there is a semistrict Lie 2-algebra where

1) The space of 0-chains is

2) The space of 1-chains is

3) The differential is the exterior derivative

4) The bracket is

5) The alternator is the bilinear map defined by

6) The Jacobiator is the identity, hence given by the trilinear map

with

Proof. We note from Equation (1) that the semi-bracket is antisymmetric. Since both S and the degree 1 chain map are zero, the alternator defined above is a chain homotopy with the right source and target. So again, we just need to check that the Lie 2-algebra axioms hold. The following identities can be checked by simple calculation, and the commutativity of the last diagram follows:

we have

Since the Jacobiator is antisymmetric and the alternator is the identity, the first and second diagrams com- mute as well. The third diagram commutes because all the edges are identity morphisms. □

Next, the hemistrict Lie 2-algebra comes with a bracket called the hemi-bracket: In degree 0, the hemi-bracket is given as Dorfman bracket:

In degree 1, it is given by: In degree 2, we necessarily have, where while

To see that the hemi-bracket is in fact a chain map, it suffices to check it on hemi-brackets of degree 1:

Theorem 3.2. is a p-order Dorfman algebroid, there is a hemistrict Lie 2-algebra where

1) The space of 0-chains is

2) The space of 1-chains is

3) The differential is the exterior derivative

4) The bracket is

5) The alternator is the bilinear map defined by

6) The Jacobiator is the identity, hence given by the trilinear map with

Proof That S is a chain homotopy with the right source and target follows from thm. (2.2) and the fact that:

Thm. (2.2) also says that the Jacobi identity holds. The following equations then imply that J is also a chain homotopy with the right source and target:

So, we just need to check that the Lie 2-algebra axioms hold. The first and the last two diagrams commute since each edge is the identity. The commutativity of the second diagram from thm. (2.2) (3) is shown as follows:

The third diagram says that and this follows from the fact that the alternator is symmetric:. □

Theorem 3.3. and are isomorphic as Lie 2-algebras.

Proof. We show that the identity chain maps with appropriate chain homotopies define Lie 2-algebra ho- momorphisms and that their composites are the respective identity homomorphisms. There is a homomorphism with the identity chain map and the chain homotopy given by This is a chain homotopy follows from the bracket relation noted in Equation (3) together with the equations

We check that the two diagrams in the definition of a Lie 2-algebra homomorphism commute. Noting that the chain map is the identity, the commutativity of the first diagram is easily checked by recalling that and are the identities. Noting that any edge given by the bracket for in degree 1 is the identity and that is the identity, we easily check the commutativity of the first diagram:

To check the commutativity of the second diagram we only need to perform the following calculation:

The second diagram meet commutativity if and only if the following equation established:

Clockwise from the upper left to the lower right corner:

Counterclockwise from the upper left to the lower right corner:

Because of the commutativity of the second diagram we must have the the following equation:

because of we get the following calculations:

(5)

if we choose

Acknowledgements

We give warmest thanks to Zhangju Liu and Yunhe Sheng for useful comments and discussion. We also thanks the referees for very helpful comments.

Funding

Research was partially supported by NSF of China (11126338, 11461047, 11201218).

Conflicts of Interest

The authors declare no conflicts of interest.

References

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