Killing spinor

Killing spinor is a term used in mathematics and physics.

Definition[edit]

By the more narrow definition, commonly used in mathematics, the term Killing spinor indicates those twistor spinors which are also eigenspinors of the Dirac operator.^[1]^[2]^[3] The term is named after Wilhelm Killing.

Another equivalent definition is that Killing spinors are the solutions to the Killing equation for a so-called Killing number.

More formally:^[4]

A Killing spinor on a Riemannian spin manifold M is a spinor field

\psi

which satisfies

\nabla _{X}\psi =\lambda X\cdot \psi

for all tangent vectors X, where

\nabla

is the spinor covariant derivative,

\cdot

is Clifford multiplication and

\lambda \in \mathbb {C}

is a constant, called the Killing number of

\psi

. If

\lambda =0

then the spinor is called a parallel spinor.

Applications[edit]

In physics, Killing spinors are used in supergravity and superstring theory, in particular for finding solutions which preserve some supersymmetry. They are a special kind of spinor field related to Killing vector fields and Killing tensors.

Properties[edit]

If ${\mathcal {M}}$ is a manifold with a Killing spinor, then ${\mathcal {M}}$ is an Einstein manifold with Ricci curvature $Ric=4(n-1)\alpha ^{2}$ , where $\alpha$ is the Killing constant.^[5]

Types of Killing spinor fields[edit]

If $\alpha$ is purely imaginary, then ${\mathcal {M}}$ is a noncompact manifold; if $\alpha$ is 0, then the spinor field is parallel; finally, if $\alpha$ is real, then ${\mathcal {M}}$ is compact, and the spinor field is called a ``real spinor field."

References[edit]

^ Th. Friedrich (1980). "Der erste Eigenwert des Dirac Operators einer kompakten, Riemannschen Mannigfaltigkei nichtnegativer Skalarkrümmung". Mathematische Nachrichten. 97: 117–146. doi:10.1002/mana.19800970111.
^ Th. Friedrich (1989). "On the conformal relation between twistors and Killing spinors". Supplemento dei Rendiconti del Circolo Matematico di Palermo, Serie II. 22: 59–75.
^ A. Lichnerowicz (1987). "Spin manifolds, Killing spinors and the universality of Hijazi inequality". Lett. Math. Phys. 13: 331–334. Bibcode:1987LMaPh..13..331L. doi:10.1007/bf00401162. S2CID 121971999.
^ Friedrich, Thomas (2000), Dirac Operators in Riemannian Geometry, American Mathematical Society, pp. 116–117, ISBN 978-0-8218-2055-1
^ Bär, Christian (1993-06-01). "Real Killing spinors and holonomy". Communications in Mathematical Physics. 154 (3): 509–521. doi:10.1007/BF02102106. ISSN 1432-0916.

Books[edit]

Lawson, H. Blaine; Michelsohn, Marie-Louise (1989). Spin Geometry. Princeton University Press. ISBN 978-0-691-08542-5.
Friedrich, Thomas (2000), Dirac Operators in Riemannian Geometry, American Mathematical Society, ISBN 978-0-8218-2055-1

External links[edit]

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[1] Th. Friedrich (1980). "Der erste Eigenwert des Dirac Operators einer kompakten, Riemannschen Mannigfaltigkei nichtnegativer Skalarkrümmung". Mathematische Nachrichten. 97: 117–146. doi:10.1002/mana.19800970111.

[2] Th. Friedrich (1989). "On the conformal relation between twistors and Killing spinors". Supplemento dei Rendiconti del Circolo Matematico di Palermo, Serie II. 22: 59–75.

[3] A. Lichnerowicz (1987). "Spin manifolds, Killing spinors and the universality of Hijazi inequality". Lett. Math. Phys. 13: 331–334. Bibcode:1987LMaPh..13..331L. doi:10.1007/bf00401162. S2CID 121971999.

[4] Friedrich, Thomas (2000), Dirac Operators in Riemannian Geometry, American Mathematical Society, pp. 116–117, ISBN 978-0-8218-2055-1

[5] Bär, Christian (1993-06-01). "Real Killing spinors and holonomy". Communications in Mathematical Physics. 154 (3): 509–521. doi:10.1007/BF02102106. ISSN 1432-0916.

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