Pin group

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Biography

The first signing of the legendary New Zealand label Flying Nun, Christchurch-based noise pop trio the Pin Group, teamed singer/guitarist Roy Montgomery, bassist Ross Humphrey, and drummer Peter Stapleton. Their 1981 debut single, the Joy Division-influenced "Ambivalence," was the first release on Flying Nun, issued in an edition of 300 copies; the follow-up, "Coat," appeared later that same year. After a 1982 EP, The Pin Group Go to Town, the band dissolved when Montgomery traveled to London for a year-long study program; he and Stapleton later renewed their collaboration as members of drone merchants Dadamah, with the complete Pin Group lineup reuniting in 1992 to record a one-off single, "Eleven Years After." ~ Jason Ankeny, Rovi

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Pin group

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For other uses, see PIN Group (disambiguation).

In mathematics, the pin group is a certain subgroup of the Clifford algebra associated to a quadratic space. It maps 2-to-1 to the orthogonal group, just as the spin group maps 2-to-1 to the special orthogonal group.

In general the map from the Pin group to the orthogonal group is not onto or a universal covering space, but if the quadratic form is definite (and dimension is greater than 2), it is both.

The non-trivial element of the kernel is denoted $-1$ , which should not be confused with the orthogonal transform of reflection through the origin, generally denoted $-I$ .

Contents

1 General definition
2 Definite form
3 Indefinite form
4 As topological group
5 Construction
- 5.1 Low dimensions
6 Center
7 Name
8 Notes
9 References

General definition

Definite form

The pin group of a definite form maps onto the orthogonal group, and each component is simply connected: it double covers the orthogonal group. The pin groups for a positive definite quadratic form $Q$ and for its negative $-Q$ are not isomorphic, but the orthogonal groups are.^{[note 1]}

In terms of the standard forms, $O(n,0) = O(0,n)$ , but $\mbox{Pin}(n,0) \not\cong \mbox{Pin}(0,n)$ . Using the "+" sign convention for Clifford algebras (where $v^2=Q(v) \in C\ell(V,Q)$ ), one writes

$\mbox{Pin}_+(n) := \mbox{Pin}(n,0) \qquad \mbox{Pin}_-(n) := \mbox{Pin}(0,n)$

and these both map onto $O(n) = O(n,0) = O(0,n)$ .

By contrast, we have the natural isomorphism^{[note 2]} $\mbox{Spin}(n,0) \cong \mbox{Spin}(0,n)$ and they are both the (unique) double cover of the special orthogonal group SO(n), which is the (unique) universal cover for $n \geq 3.$

Indefinite form

This section requires expansion.

There are as many as eight different double covers of Spin(p,q), for $p,q\neq 0$ , which correspond to the extensions of the center (which is either $C_2 \times C_2$ or $C_4$ ) by $C_2$ . Only two of them are pin groups—those that admit the Clifford algebra as a representation. They are called Pin(p,q) and Pin(q,p) respectively.

As topological group

Every connected topological group has a unique universal cover as a topological space, which has a unique group structure as a central extension by the fundamental group. For a disconnected topological group, there is a unique universal cover of the identity component of the group, and one can take the same cover as topological spaces on the other components (which are principal homogeneous spaces for the identity component) but the group structure on other components is not uniquely determined in general.

The Pin and Spin groups are particular topological groups associated to the orthogonal and special orthogonal groups, coming from Clifford algebras: there are other similar groups, corresponding to other double covers or to other group structures on the other components, but they are not referred to as Pin or Spin groups, nor studied much.

Recently, Andrzej Trautman ^[1] found the set of all 32 inequivalent double covers of O(p) x O(q), the maximal compact subgroup of O(p,q) and an explicit construction of 8 double covers of the same group O(p,q).

Construction

The two pin groups correspond to the two central extensions

$1 \to \{\pm 1\} \to \mbox{Pin}_\pm(V) \to O(V) \to 1.$

The group structure on $\mbox{Spin}(V)$ (the connected component of determinant 1) is already determined; the group structure on the other component is determined up to the center, and thus has a $\pm 1$ ambiguity.

The two extensions are distinguished by whether the preimage of a reflection squares to $\pm 1 \in \ker \left(\mbox{Spin}(V) \to SO(V)\right)$ , and the two pin groups are named accordingly. Explicitly, a reflection has order 2 in $O(V)$ , $r^2=1$ , so the square of the preimage of a reflection (which has determinant one) must be in the kernel of $\mbox{Spin}_\pm(V) \to SO(V)$ , so $\tilde r^2 = \pm 1$ , and either choice determines a pin group (since all reflections are conjugate by an element of $SO(V)$ , which is connected, all reflections must square to the same value).

Concretely, in $\mbox{Pin}_+$ , $\tilde r$ has order 2, and the preimage of a subgroup $\{1,r\}$ is $C_2 \times C_2$ : if one repeats the same reflection twice, one gets the identity.

In $\mbox{Pin}_-$ , $\tilde r$ has order 4, and the preimage of a subgroup $\{1,r\}$ is $C_4$ : if one repeats the same reflection twice, one gets "a rotation by 2π"—the non-trivial element of $\mbox{Spin}(V) \to SO(V)$ can be interpreted as "rotation by 2π" (every axis yields the same element).

Low dimensions

In 2 dimensions, the distinction between $\mbox{Pin}_+$ and $\mbox{Pin}_-$ mirrors the distinction between the dihedral group of a $2n$ -gon and the dicyclic group of the cyclic group $C_{2n}$ .

In $\mbox{Pin}_+$ , the preimage of the dihedral group of an $n$ -gon, considered as a subgroup $\mbox{Dih}_n < O(2)$ , is the dihedral group of an $2n$ -gon, $\mbox{Dih}_{2n} < \mbox{Pin}_+(2)$ , while in $\mbox{Pin}_-$ , the preimage of the dihedral group is the dicyclic group $\mbox{Dic}_n < \mbox{Pin}_-(2)$ .

The resulting commutative square of subgroups for Spin(2), $\mbox{Pin}_+(2),$ SO(2), O(2) – namely C_2n, Dih_2n, C_n, Dih_n – is also obtained using the projective orthogonal group (going down from O by a 2-fold quotient, instead of up by a 2-fold cover) in the square SO(2), O(2), PSO(2), PO(2), though in this case it is also realized geometrically, as "the projectivization of a 2n-gon in the circle is an n-gon in the projective line".

In 1 dimension, the pin groups are congruent to the first dihedral and dicyclic groups:

$\begin{align} \mbox{Pin}_+(1) &\cong C_2 \times C_2 = \mbox{Dih}_1\\ \mbox{Pin}_-(1) &\cong C_4 = \mbox{Dic}_1. \end{align}$

Center

This section is empty. You can help by adding to it.

Name

The name was introduced in (Atiyah, Bott & Shapiro 1964, page 3, line 17), where they state "This joke is due to J-P. Serre". It is a back-formation from Spin: "Pin is to O(n) as Spin is to SO(n)", hence dropping the "S" from "Spin" yields "Pin". Further, the word "Pin" sounds like vulgar French slang when pronounced in French, which is alluded to by the name originating with (or being attributed to) Serre.^[2]^{[note 3]}

Notes

^ In fact, they are equal as subsets of GL(V), not just isomorphic as abstract groups: an operator preserves a form if and only if it preserves the negative form.
^ They are subalgebras of the different algebras $C\ell(n,0) \not\cong C\ell(0,n)$ , but they are equal as subsets of the vector spaces $C\ell(n,0) = C\ell(0,n) = \Lambda^* \mathbf{R}^n$ , and carry the same algebra structure, hence they are naturally identified.
^ French slang "pine" means "penis", and further, saying that the "pin group has 2 parts" (the even part (Spin) and the odd part) suggests proximate anatomical comparisons.

References

^ A. Trautman (2001). "Double Covers of Pseudo-orthogonal Groups". Clifford Analysis and Its Applications, NATO Science Series, 25: 377–388.
^ Pertti Lounesto (04 December 1993). "Re: Math jokes (dirty): Explanation". sci.math. (Web link). Retrieved 2011-09-02.

Atiyah, M.F.; Bott, R.; Shapiro, A. (1964), "Clifford modules", Topology 3, suppl. 1: 3–38

This entry is from Wikipedia, the leading user-contributed encyclopedia. It may not have been reviewed by professional editors (see full disclaimer)

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Pin group

Pin Group

Biography

Pin group

Pin group

General definition

Definite form

Indefinite form

As topological group

Construction

Low dimensions

Center

Name

Notes

References

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