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| In [[mathematics]], the '''projective unitary group''' PU(''n'') is the [[quotient group|quotient]] of the [[unitary group]] U(''n'') by the right multiplication of its [[centre of a group|center]], U(1), embedded as scalars.
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| Abstractly, it is the [[holomorphic]] [[isometry group]] of [[complex projective space]], just as the [[projective orthogonal group]] is the isometry group of [[real projective space]].
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| In terms of [[matrix (mathematics)|matrices]], elements of U(''n'') are complex ''n''×''n'' unitary matrices, and elements of the center are diagonal matrices equal to <math>e^{i\theta}</math> multiplied by the identity matrix. Thus elements of PU(''n'') correspond to equivalence classes of unitary matrices under multiplication by a constant phase θ.
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| Abstractly, given a [[Hermitian space]] ''V'', the group PU(''V'') is the image of the unitary group U(''V'') in the automorphism group of the projective space '''P'''(''V'').
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| ==Projective special unitary group==
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| [[Image:PSU-PU.svg|right]]
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| The projective [[special unitary group]] PSU(''n'') is equal to the projective unitary group, in contrast to the orthogonal case.
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| The connections between the U(''n''), SU(''n''), their centers, and the projective unitary groups is shown at right.
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| The [[Center_of_a_group|center]] of the [[special unitary group]] is the scalar matrices of the ''n''th roots of unity:
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| <math>Z(\mbox{SU}(n)) = \mbox{SU}(n) \cap Z(\mbox{U}(n)) \cong \mathbf{Z}/n</math>
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| The natural map
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| :<math>\mbox{PSU}(n) = \mbox{SU}(n)/Z(\mbox{SU}(n)) \to \mbox{PU}(n) = \mbox{U}(n)/Z(\mbox{U}(n))</math>
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| is an isomorphism, by the [[second isomorphism theorem]], thus
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| :PU(''n'') = PSU(''n'') = SU(''n'')/('''Z'''/''n'').
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| and the special unitary group SU(''n'') is an ''n''-fold cover of the projective unitary group.
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| ==Examples==
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| At ''n'' = 1, U(1) is abelian and so is equal to its center. Therefore PU(1) = U(1)/U(1) is a [[trivial group]].
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| At ''n'' = 2, <math>\mbox{SU}(2) \cong \mbox{Spin}(3) \cong \mbox{Sp}(1)</math>, all being representable by unit norm quaternions, and PU(2) ≅ SO(3), via:
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| :<math>\mbox{PU}(2) = \mbox{PSU}(2) = \mbox{SU}(2)/(\mathbf{Z}/2) \cong \mbox{Spin}(3)/(\mathbf{Z}/2) = \mbox{SO}(3)</math>
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| ==Finite fields==
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| {{seealso|Unitary group#Finite fields}}
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| One can also define unitary groups over finite fields: given a field of order ''q,'' there is a non-degenerate Hermitian structure on vector spaces over <math>\mathbf{F}_{q^2}</math>, unique up to unitary congruence, and correspondingly a matrix group denoted U(''n'', ''q'') or <math>U\left(n,q^2\right)</math>, and likewise special and projective unitary groups. For convenience, this article with use the <math>U(n,q^2)</math> convention.
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| Recall that [[Finite_field#Cyclic|the group of units of a finite field is cyclic]], so the group of units of <math>\mathbf{F}_{q^2}</math>, and thus the group of invertible scalar matrices in <math>GL(n,q^2)</math>, is the cyclic group of order <math>q^2-1</math>. The center of <math>U(n,q^2)</math> has order ''q''+1 and consists of the scalar matrices which are unitary, that is those matrices <math>cI_V</math> with <math>c^{q+1}=1</math>. The center of the special unitary group has order <math>\gcd(n,q+1)</math> and consists of those unitary scalars which also have order dividing ''n''.
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| The quotient of the unitary group by its center is the '''projective unitary group''', <math>PU(n,q^2)</math>, and the quotient of the special unitary group by its center is the '''projective special unitary group''' <math>PSU(n,q^2)</math>. In most cases (<math> n \geq 2</math> and <math>(n,q^2) \notin \{ (2,2^2), (2,3^2), (3,2^2) \}</math>), <math>SU(n,q^2)</math> is a [[perfect group]] and <math>PSU(n,q^2)</math> is a finite [[simple group]], {{harv|Grove|2002|loc=Thm. 11.22 and 11.26}}.
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| ==The topology of PU(''H'')==
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| ===PU(''H'') is a classifying space for circle bundles===
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| The same construction may be applied to matrices acting on an infinite-dimensional [[Hilbert space]] <math>\mathcal H</math>.
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| Let U(''H'') denote the space of unitary operators on an infinite-dimensional Hilbert space. When ''f'': ''X'' → U(''H'') is a continuous mapping of a compact space ''X'' into the unitary group, one can use a finite dimensional approximation of its image and a simple K-theoretic tric
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| : <math>u \oplus 1_{\ell^2} \sim u \oplus 1_{\ell^2} \oplus 1_{\ell^2} \oplus \cdots \sim u \oplus u^{-1} \oplus u \oplus u^{-1} \oplus \cdots \sim 1_{\ell^2} \oplus 1_{\ell^2} \oplus \cdots (u \in {\rm U}(H))</math>
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| to show that it is actually homotopic to the trivial map onto a single point. This means that U(''H'') is weakly contractible, and an additional argument shows that it is actually contractible. Note that this is a purely infinite dimensional phenomenon, in contrast to the finite-dimensional cousins U(''n'') and their limit U(∞) under the inclusion maps which are not contractible admitting homotopically nontrivial continuous mappings onto U(1) given by the determinant of matrices.
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| The center of the infinite-dimensional unitary group U(<math>\mathcal H</math>) is, as in the finite dimensional case, U(1), which again acts on the unitary group via multiplication by a phase. As the unitary group does not contain the zero matrix, this action is free. Thus U(<math>\mathcal H</math>) is a contractible space with a U(1) action, which identifies it as [[EU(1)]] and the space of U(1) orbits as [[BU(1)]], the [[classifying space]] for U(1).
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| ===The homotopy and (co)homology of PU(''H'')===
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| PU(<math>\mathcal H</math>) is defined precisely to be the space of orbits of the U(1) action on U(<math>\mathcal H</math>), thus PU(<math>\mathcal H</math>) is a realization of the classifying space BU(1). In particular, using the isomorphism
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| :<math>\pi_n(X)=\pi_{n+1}(BX)</math>
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| between the [[homotopy group]]s of a space X and the homotopy groups of its classifying space BX, combined with the homotopy type of the circle U(1)
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| :<math>\pi_1(U(1))=\mathbf Z,</math> <math> \pi_{k\neq 1}(U(1))=0</math>
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| we find the homotopy groups of PU(<math>\mathcal H</math>)
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| :<math>\pi_2(PU(\mathcal H))=\mathbf Z,</math> <math> \pi_{k\neq 2}(PU(\mathcal H))=0</math>
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| thus identifying PU(<math>\mathcal H</math>) as a representative of the [[Eilenberg–MacLane space]] K('''Z''',2).
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| As a consequence, PU(<math>\mathcal H</math>) must be of the same homotopy type as the infinite-dimensional [[complex projective space]], which also represents K('''Z''',2). This means in particular that they have isomorphic [[homology (mathematics)|homology]] and [[cohomology]] groups
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| :H<sup>2n</sup>(PU(<math>\mathcal H</math>))=H<sub>2n</sub>(PU(<math>\mathcal H</math>))='''Z'''
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| and
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| :H<sup>2n+1</sup>(PU(<math>\mathcal H</math>))=H<sub>2n+1</sub>(PU(<math>\mathcal H</math>))=0. | |
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| == Representations ==
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| ===The adjoint representation===
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| PU(''n'') in general has no ''n''-dimensional representations, just as SO(3) has no two-dimensional representations.
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| PU(''n'') has an adjoint action on SU(''n''), thus it has an (''n''<sup>2</sup>-1)-dimensional representation. When ''n''=2 this corresponds to the three dimensional representation of SO(3). The adjoint action is defined by thinking of an element of PU(''n'') as an equivalence class of elements of U(''n'') that differ by phases. One can then take the adjoint action with respect to any of these U(''n'') representatives, and the phases commute with everything and so cancel. Thus the action is independent of the choice of representative and so it is well-defined.
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| ===Projective representations===
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| In many applications PU(''n'') does not act in any linear representation, but instead in a [[projective representation]], which is a representation up to a phase which is independent of the vector on which one acts. These are useful in quantum mechanics, as physical states are only defined up to phase. For example, massive fermionic states transform under a projective representation but not under a representation of the little group PU(2)=SO(3).
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| The projective representations of a group are classified by its second integral [[cohomology]], which in this case is
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| :H<sup>2</sup>(PU(''n'')) = '''Z'''/''n'' or H<sup>2</sup>(PU(<math>\mathcal H </math>)) = '''Z'''.
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| The cohomology groups in the finite case can be derived from the [[long exact sequence]] for bundles and the above fact that SU(''n'') is a '''Z'''/''n'' bundle over PU(''n''). The cohomology in the infinite case was argued above from the isomorphism with the cohomology of the infinite complex projective space.
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| Thus PU(''n'') enjoys ''n'' projective representations, of which the first is the fundamental representation of its SU(''n'') cover, while PU(<math>\mathcal H </math>) has a countably infinite number. As usual, the projective representations of a group are ordinary representations of a [[Group extension%23Central extension|central extension]] of the group. In this case the central extended group corresponding to the first projective representation of each projective unitary group is just the original [[unitary group]] that we quotiented by U(1) in the definition of PU.
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| ==Applications==
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| ===Twisted K-theory===
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| The adjoint action of the infinite projective unitary group is useful in geometric definitions of [[twisted K-theory]]. Here the adjoint action of the infinite-dimensional PU(<math>\mathcal H </math>) on either the [[Fredholm operator]]s or the infinite [[unitary group]] is used.
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| In geometrical constructions of twisted K-theory with twist ''H'', the PU(<math>\mathcal H </math>) is the fiber of a bundle, and different twists ''H'' correspond to different fibrations. As seen below, topologically PU(<math>\mathcal H </math>) represents the [[Eilenberg–Maclane space]] K('''Z''',2), therefore the classifying space of PU(<math>\mathcal H </math>) bundles is the Eilenberg–Maclane space K('''Z''',3). K('''Z''',3) is also the classifying space for the third integral [[cohomology]] group, therefore PU(<math>\mathcal H </math>) bundles are classified by the third integral cohomology. As a result, the possible twists ''H'' of a twisted K-theory are precisely the elements of the third integral cohomology.
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| ===Pure Yang–Mills gauge theory===
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| In the pure Yang–Mills SU(''n'') [[gauge theory]], which is a gauge theory with only [[gluon]]s and no fundamental matter, all fields transform in the adjoint of the gauge group SU(''n''). The '''Z'''/''n'' center of SU(''n'') commutes, being in the center, with SU(''n'')-valued fields and so the adjoint action of the center is trivial. Therefore the gauge symmetry is the quotient of SU(''n'') by '''Z'''/''n'', which is PU(''n'') and it acts on fields using the adjoint action described above.
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| In this context, the distinction between SU(''n'') and PU(''n'') has an important physical consequence. SU(''n'') is simply connected, but the fundamental group of PU(''n'') is '''Z'''/''n'', the cyclic group of order ''n''. Therefore a PU(''n'') gauge theory with adjoint scalars will have nontrivial codimension 2 [[vortex|vortices]] in which the expectation values of the scalars wind around PU(''n'')'s nontrivial cycle as one encircles the vortex. These vortices, therefore, also have charges in '''Z'''/''n'', which implies that they attract each other and when ''n'' come into contact they annihilate. An example of such a vortex is the [[Douglas–Shenker string]] in SU(''n'') [[Seiberg–Witten gauge theory|Seiberg–Witten gauge theories]].
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| == References ==
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| <references/>
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| *{{Citation | last1=Grove | first1=Larry C. | title=Classical groups and geometric algebra | publisher=[[American Mathematical Society]] | location=Providence, R.I. | series=Graduate Studies in Mathematics | isbn=978-0-8218-2019-3 | id={{MathSciNet | id = 1859189}} | year=2002 | volume=39}}
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| == See also ==
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| *[[unitary group]]
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| *[[special unitary group]]
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| *[[unitary operators]]
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| *[[projective orthogonal group]]
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| [[Category:Lie groups]]
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