DifferentialGeometry/Tensor/ConjugateSpinor

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Tensor[ConjugateSpinor] - calculate the complex conjugate of a spinor

Calling Sequences

ConjugateSpinor(S, ConjCoord)

Parameters

S - a spinor

ConjCoord - (optional) keyword argument conjugatecoordinates = C, where C is a list of lists specifying conjugate coordinates

Description

Examples

See Also

Description

•	The command ConjugateSpinor(S) calculates the complex conjugate of an arbitrary spinor S.

•	For spinors with real parameters, the assuming command of Maple can be used to properly calculate the complex conjugates.

•	This command is part of the DifferentialGeometry:-Tensor package, and so can be used in the form ConjugateSpinor(...) only after executing the commands with(DifferentialGeometry); with(Tensor) in that order. It can always be used in the long form DifferentialGeometry:-Tensor:-ConjugateSpinor.

Examples

>	$with (DifferentialGeometry) &colon;$ $with (Tensor) &colon;$

Example 1.

First create a vector bundle $E \to M$ with base coordinates $(x, y, z, t)$ and fiber coordinates $(z1, z2, w1, w2)$ . For spinor applications, it is tacitly assumed that $(z1, z2)$ are complex coordinates with complex conjugates $(w1, w2)$ .

>	$DGsetup ([x, y, z, t], [z1, z2, w1, w2], E)$

$frame name: E$

(2.1)

Define spinors $S1$ and $S2$ and calculate their complex conjugates.

E >	$S1 ≔ D_z1$

$S1 := D_z1$

(2.2)

E >	$ConjugateSpinor (S1)$

$D_w1$

(2.3)

E >	$S2 ≔ dw1 + 3 I dw2$

$S2 := dw1 + 3 I dw2$

(2.4)

E >	$ConjugateSpinor (S2)$

$dz1 - 3 I dz2$

(2.5)

Example 2.

The two type $(1, 1)$ Kronecker delta spinors are complex conjugates of each other.

E >	$S3 ≔ KroneckerDeltaSpinor (spinor)$

$S3 := D_z1 dz1 + D_z2 dz2$

(2.6)

E >	$S4 ≔ KroneckerDeltaSpinor (barspinor)$

$S4 := D_w1 dw1 + D_w2 dw2$

(2.7)

E >	$ConjugateSpinor (S3) &minus S4$

$0 D_z1 dz1$

(2.8)

Example 3.

The soldering form is always a Hermitian spinor. To check this calculate, first define the solder form $σ_{}$ , then conjugate $σ$ and interchange the 2nd and 3rd indices. The result is the original solder form $σ$ .

E >	$F ≔ [D_t, D_x, D_y, D_z] &colon;$

E >	$σ ≔ SolderForm (F)$

$σ ≔ \frac{\sqrt{2}}{2} dx D_z1 D_w2 + \frac{\sqrt{2}}{2} dx D_z2 D_w1 - \frac{I}{2} \sqrt{2} dy D_z1 D_w2 + \frac{I}{2} \sqrt{2} dy D_z2 D_w1 + \frac{\sqrt{2}}{2} dz D_z1 D_w1 - \frac{\sqrt{2}}{2} dz D_z2 D_w2 + \frac{\sqrt{2}}{2} dt D_z1 D_w1 + \frac{\sqrt{2}}{2} dt D_z2 D_w2$

(2.9)

E >	$bar_sigma ≔ ConjugateSpinor (σ)$

$bar_sigma ≔ \frac{\sqrt{2}}{2} dx D_w1 D_z2 + \frac{\sqrt{2}}{2} dx D_w2 D_z1 + \frac{I}{2} \sqrt{2} dy D_w1 D_z2 - \frac{I}{2} \sqrt{2} dy D_w2 D_z1 + \frac{\sqrt{2}}{2} dz D_w1 D_z1 - \frac{\sqrt{2}}{2} dz D_w2 D_z2 + \frac{\sqrt{2}}{2} dt D_w1 D_z1 + \frac{\sqrt{2}}{2} dt D_w2 D_z2$

(2.10)

E >	$σ &minus RearrangeIndices (bar_sigma, [[2, 3]])$

$0 dx D_z1 D_z1$

(2.11)

Example 4.

Use the Maple assuming command to simplify the complex conjugate of a spinor-tensor containing a real parameter $α_{}$ .

E >	$S5 ≔ evalDG (α D_t &t D_w1 + \frac{x}{α} D_z &t D_w2)$

$S5 ≔ \frac{x}{α} D_z D_w2 + α D_t D_w1$

(2.12)

E >	$S6 ≔ ConjugateSpinor (S5) assuming α :: real$

$S6 ≔ \frac{x}{α} D_z D_z2 + α D_t D_z1$

(2.13)

Example 6.

In some applications complex coordinates on the base space are used. Suppose, for example, that $z$ and $t$ are real coordinates and that $u$ is a complex coordinate with complex conjugate $v$ .

M >	$DGsetup ([u, v, z, t], [z1, z2, w1, w2], N)$

$frame name: N$

(2.14)

N >	$S7 ≔ evalDG (v D_z1 &t dz2 + t u D_z2 &t dz1)$

$S7 ≔ v D_z1 dz2 + t u D_z2 dz1$

(2.15)

Use the keyword argument conjugatecoordinates to specify that the conjugate of $u$ is $v$ (and the conjugate of $v$ is $u$ ).

N >	$ConjugateSpinor (S7, conjugatecoordinates = [[u, v]])$

$u D_w1 dw2 + t v D_w2 dw1$

(2.16)

N >	$S8 ≔ evalDG (α D_u &t dz2)$

$S8 ≔ α D_u dz2$

(2.17)

N >	$ConjugateSpinor (S8, conjugatecoordinates = [[u, v]]) assuming α :: real$

$α D_v dw2$

(2.18)

	See Also
	DifferentialGeometry, Tensor, assuming, DGmap, KroneckerDeltaSpinor, RearrangeIndices, SolderForm

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