nLab PU(ℋ)

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Contents

Context

Group Theory

Operator algebra

Idea
Properties

General
Homomorphisms into $PU(\mathcal{H})$

Related concepts
Literature

Idea

The projective unitary group on an infinite-dimensional separable complex Hilbert space $\mathcal{H}$ is traditionally denoted $PU(\mathcal{H})$ , being the quotient of the unitary group U(ℋ) by its circle subgroup $S^1 \simeq S(\mathbb{C}) \simeq$ U(1).

Properties

General

Proposition

The U(1)-quotient space coprojection of U(ℋ) over PU(ℋ) – both in their strong operator topology – is a circle-principal bundle:

\array{ S^1 &\hookrightarrow& \mathrm{U}(\mathcal{H}) \\ && \big\downarrow \\ && PU(\mathcal{H}) \mathrlap{ \; \simeq \; \mathrm{U}(\mathcal{H})/S^1 } }

(Simms 1970, Thm. 1)

Remark

Prop. means in particular that $\mathrm{U}(\mathcal{H}) \xrightarrow{\;} PU(\mathcal{H})$ is locally trivial, hence that the coset space coprojection $\mathrm{U}(\mathcal{H}) \xrightarrow{\;} \mathrm{U}(\mathcal{H})/S^1$ admits local sections. See also at coset space coprojection admitting local sections.

Proposition

In its operator topology (here), $PU(\mathcal{H})$ is a well-pointed topological group.

(Hebestreit & Sagave 2020, p. 23, using Dardalat & Pennig 2016, Prop. 2.26)

Homomorphisms into $PU(\mathcal{H})$

Since $\Gamma \,\coloneqq\,$ PU(ℋ) is not a (finite-dimensional) Lie group, it falls outside the applicability of the general theorem that nearby homomorphisms from compact Lie groups are conjugate. Nevertheless, the conclusion still holds, at least for domain $G$ a discrete, hence finite group:

The PU(ℋ)-space of homomorphisms $Hom\big(G,\, PU(\mathcal{H})\big)$ is a disjoint union (as here) of orbits of the conjugation action.

This is established in Uribe & Lück 2013, Sec. 15, p. 38.

Related concepts

Literature

General discussion:

David John Simms, Topological aspects of the projective unitary group, Math. Proc. Camb. Phil. Soc. 68 1 (1970) 57-60 (doi:10.1017/S0305004100001043)
Bernardo Uribe, Wolfgang Lück, Section 15 of: Equivariant principal bundles and their classifying spaces, Algebr. Geom. Topol. 14 (2014) 1925-1995 (arXiv:1304.4862, doi:10.2140/agt.2014.14.1925)
Jesus Espinoza, Bernardo Uribe, Topological properties of spaces of projective unitary representations, Rev. Acad. Colombiana Cienc. Exact. Fís. Natur. 40 (2016), no. 155, 337-352 (arXiv:1511.06785, scielo:S0370-39082016000200013, doi:10.18257/raccefyn.317)

Concerning well-pointedness:

Fabian Hebestreit, Steffen Sagave, p. 23 of: Homotopical and operator algebraic twisted K-theory, Mathematische Annalen 378 (2020) 1021-1059 (arXiv:1904.01872, doi:10.1007/s00208-020-02066-6)

The $\mathbb{Z}/2$ -graded projective unitary group, (reflecting the twists of twisted K-theory not just in degree 3 but also in degree 1):

Ellen Maycock Parker, Prop. 2.2 of: The Brauer Group of Graded Continuous Trace $C^\ast$ -Algebras, Transactions of the American Mathematical Society 308 1 (1988) (jstor:2000953)

reviewed in

Alan Carey, Bai-Ling Wang, p. 5 of: Thom isomorphism and Push-forward map in twisted K-theory, Journal of K-Theory 1 2 (2008) 357-393 (arXiv:math/0507414, doi:10.1017/is007011015jkt011)

Last revised on September 15, 2022 at 16:26:35. See the history of this page for a list of all contributions to it.

nLab PU(ℋ)

Context

Group Theory

Operator algebra

Concepts

Theorems

States and observables

Operator algebra

Local QFT

Perturbative QFT

Contents

Idea

Properties

General

Proposition

Remark

Proposition

Homomorphisms into $PU(\mathcal{H})$

Related concepts

Literature

nLab PU(ℋ)

Context

Group Theory

Operator algebra

Concepts

Theorems

States and observables

Operator algebra

Local QFT

Perturbative QFT

Contents

Idea

Properties

General

Proposition

Remark

Proposition

Homomorphisms into PU(ℋ)PU(\mathcal{H})

Related concepts

Literature

Homomorphisms into $PU(\mathcal{H})$