Harmonic Spinor

In mathematics and quantum mechanics, a Dirac operator is a differential operator that is a formal square root, or half-iterate, of a second-order operator such as a Laplacian. The original case which concerned Paul Dirac was to factorise formally an operator for Minkowski space, to get a form of quantum theory compatible with special relativity; to get the relevant Laplacian as a product of first-order operators he introduced spinors. It was first published in 1928.

Formal definition

In general, let ''D'' be a first-order differential operator acting on a vector bundle ''V'' over a Riemannian manifold ''M''. If
:$D^2=\Delta, \,$
where ∆ is the Laplacian of ''V'', then ''D'' is called a Dirac operator.

In high-energy physics, this requirement is often relaxed: only the second-order part of ''D''² must equal the Laplacian.

Examples

Example 1

''D'' = −''i'' ∂_''x'' is a Dirac operator on the tangent bundle over a line.

Example 2

Consider a simple bundle of notable importance in physics: the configuration space of a particle with spin confined to a plane, which is also the base manifold. It is represented by a wavefunction
:$\psi(x,y) = \begin\chi(x,y) \\ \eta(x,y)\end$
where ''x'' and ''y'' are the usual coordinate functions on R². ''χ'' specifies the probability amplitude for the particle to be in the spin-up state, and similarly for ''η''. The so-called spin-Dirac operator can then be written
:$D=-i\sigma_x\partial_x-i\sigma_y\partial_y ,$
where ''σ''_''i'' are the Pauli matrices. Note that the anticommutation relations for the Pauli matrices make the proof of the above defining property trivial. Those relations define the notion of a Clifford algebra.

Solutions to the Dirac equation for spinor fields are often called ''harmonic spinors''.

Example 3

Feynman's Dirac operator describes the propagation of a free fermion in three dimensions and is elegantly written
:$D=\gamma^\mu\partial_\mu\ \equiv \partial\!\!\!/,$
using the Feynman slash notation. In introductory textbooks to quantum field theory, this will appear in the form

:$D = c\vec\alpha \cdot (-i\hbar\nabla_x) + mc^2\beta$

where $\vec\alpha = (\alpha_1, \alpha_2, \alpha_3)$ are the off-diagonal Dirac matrices $\alpha_i=\beta\gamma_i$, with $\beta=\gamma_0$ and the remaining constants are $c$ the speed of light, $\hbar$ being Planck's constant, and $m$ the mass of a fermion (for example, an electron). It acts on a four-component wave function $\psi(x) \in L^2(\mathbb^3, \mathbb^4)$, the Sobolev space of smooth, square-integrable functions. It can be extended to a self-adjoint operator on that domain. The square, in this case, is not the Laplacian, but instead $D^2=\Delta+m^2$ (after setting $\hbar=c=1.$)

Example 4

Another Dirac operator arises in Clifford analysis. In euclidean ''n''-space this is
:$D=\sum_^e_\frac$
where is an orthonormal basis for euclidean ''n''-space, and R^''n'' is considered to be embedded in a Clifford algebra.

This is a special case of the Atiyah–Singer–Dirac operator acting on sections of a spinor bundle.

Example 5

For a spin manifold, ''M'', the Atiyah–Singer–Dirac operator is locally defined as follows: For and ''e₁''(''x''), ..., ''e_j''(''x'') a local orthonormal basis for the tangent space of ''M'' at ''x'', the Atiyah–Singer–Dirac operator is
:$D=\sum_^e_(x)\tilde_ ,$
where $\tilde$ is the spin connection, a lifting of the Levi-Civita connection on ''M'' to the spinor bundle over ''M''. The square in this case is not the Laplacian, but instead $D^2=\Delta+R/4$ where $R$ is the scalar curvature of the connection. Jurgen Jost, (2002) "Riemannian Geometry ang Geometric Analysis (3rd edition)", Springer. ''See section 3.4 pages 142 ff.''

Example 6

On Riemannian manifold $(M, g)$ of dimension $n=dim(M)$ with Levi-Civita connection $\nabla$and an orthonormal basis $\_^$, we can define exterior derivative $d$ and coderivative $\delta$ as

$d= e^\wedge \nabla_, \quad \delta =e^ \lrcorner \nabla_$.

Then we can define a Dirac-Kähler operator $D$, as follows

$D = e^\nabla_=d-\delta$.

The operator acts on sections of Clifford bundle in general, and it can be restricted to spinor bundle, an ideal of Clifford bundle, only if the projection operator on the ideal is parallel.

Generalisations

In Clifford analysis, the operator acting on spinor valued functions defined by
:$f(x_1,\ldots,x_k)\mapsto \begin \partial_f\\ \partial_f\\ \ldots\\ \partial_f\\ \end$
is sometimes called Dirac operator in ''k'' Clifford variables. In the notation, ''S'' is the space of spinors, $x_i=(x_,x_,\ldots,x_)$ are ''n''-dimensional variables and $\partial_=\sum_j e_j\cdot \partial_$ is the Dirac operator in the ''i''-th variable. This is a common generalization of the Dirac operator () and the Dolbeault operator (, ''k'' arbitrary). It is an invariant differential operator, invariant under the action of the group . The resolution of ''D'' is known only in some special cases.

See also

* AKNS hierarchy
* Dirac equation
*Clifford algebra
* Clifford analysis
* Connection
*Dolbeault operator
*Heat kernel
* Spinor bundle

References

*
* {{citation , last1=Colombo, F., first1=I., last2=Sabadini , first2=I. , author2-link=Irene Sabadini, title = Analysis of Dirac Systems and Computational Algebra, publisher=Birkhauser Verlag AG , year=2004, isbn=978-3-7643-4255-5

Differential operators
Quantum mechanics
Mathematical physics