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groupoid representation theorem

(Theorem)

Groupoid representation theorem

We shall briefly consider a main result due to Hahn (1978) that relates groupoid and associated groupoid algebra representations:

Theorem 0.1 (source: [2,3].) Any representation of a groupoid ${\mathsf{G}}$ with Haar measure $(\nu, \mu)$ in a separable Hilbert space $\H$ induces a *-algebra representation $f \mapsto X_f$ of the associated groupoid algebra $\Pi {\mathsf{G}}, \nu)$ in $L^2 (U_{{\mathsf{G}}} , \mu, \H )$ with the following properties:

(1)	For any $l,m \in H$ , one has that $\left\vert<X_f(u \mapsto l), (u \mapsto m)>\right\vert\leq \left\Vert f_l\right\Vert \left\Vert l \right\Vert \left\Vert m \right\Vert$ and
(2)	$M_r (\alpha) X_f = X_{f \alpha \circ r}$ , where $M_r: L^\infty (U_{{\mathsf{G}}}, \mu, \H ) \longrightarrow \mathcal L ( L^2 (U_{{\mathsf{G}}}, \mu, \H ))$ , with $M_r (\alpha)j = \alpha \cdot j$ .

Conversely, any *-algebra representation with the above two properties induces a groupoid representation, X, as follows:

$\displaystyle \left\langle X_f , j, k\right\rangle ~ = ~ \int f(x)[X(x)j(d(x)),k(r(x))d \nu (x)],$

(0.1)

(cf. p. 50 of Hahn, 1978).

Remarks

Furthermore, according to Seda (1986, on p.116) the continuity of a Haar system is equivalent to the continuity of the convolution product $f*g$ for any pair $f, g$ of continuous functions with compact support. One may thus conjecture that similar results could be obtained for functions with locally compact support in dealing with convolution products of either locally compact groupoids or quantum groupoids. Seda's result also implies that the convolution algebra $C_{conv}({\mathsf{G}})$ of a groupoid ${\mathsf{G}}$ is closed with respect to the convolution * if and only if the fixed Haar system associated with the measured groupoid ${\mathsf{G}}$ is continuous (Buneci, 2003).

In the case of groupoid algebras of transitive groupoids, Buneci (2003) showed that representations of a measured groupoid $({{\mathsf{G}}, [\int \nu ^u d \tilde{ \lambda}(u)]=[\lambda]})$ on a separable Hilbert space $\H$ induce non-degenerate $*$ –representations $f \mapsto X_f$ of the associated groupoid algebra $\Pi ({\mathsf{G}}, \nu,\tilde{\lambda})$ with properties formally similar to (1) and (2) above. Moreover, as in the case of groups, there is a correspondence between the unitary representations of a groupoid and its associated C*–convolution algebra representations (p.182 of Buneci, 2003), the latter involving however fiber bundles of Hilbert spaces instead of single Hilbert spaces. Therefore, groupoid representations appear as the natural construct for Algebraic Quantum Field Theories (AQFT) in which nets of local observable operators in Hilbert space fiber bundles were introduced by Rovelli (1998).

Bibliography

1: R. Gilmore: Lie Groups, Lie Algebras and Some of Their Applications., Dover Publs., Inc.: Mineola and New York, 2005.
2: P. Hahn: Haar measure for measure groupoids., Trans. Amer. Math. Soc. 242: 1–33(1978). (Theorem 3.4 on p. 50).
3: P. Hahn: The regular representations of measure groupoids., Trans. Amer. Math. Soc. 242:34–72(1978).
4: R. Heynman and S. Lifschitz. 1958. Lie Groups and Lie Algebras., New York and London: Nelson Press.
5: C. Heunen, N. P. Landsman, B. Spitters.: A topos for algebraic quantum theory, (2008); arXiv:0709.4364v2 [quant–ph]

"groupoid representation theorem" is owned by bci1.

Also defines:

associated groupoid algebra representations, *-algebra representation, separable Hilbert space, convolution, convolution product $f*g$

for any pair $f, g$

of continuous functions

Keywords:

groupoid representation theorem, groupoid representation

Cross-references: operators, observable, AQFT, Algebraic Quantum Field Theories, Hilbert spaces, groups, quantum groupoids, locally compact groupoids, functions, Haar system, groupoid representation, Haar measure, representation, groupoid
There are 16 references to this object.

This is version 2 of groupoid representation theorem, born on 2009-05-01, modified 2009-05-01.
Object id is 709, canonical name is GroupoidRepresentationTheorem.
Accessed 1335 times total.

Classification:

Physics Classification:	00. (GENERAL)
	02. (Mathematical methods in physics)
	03. (Quantum mechanics, field theories, and special relativity )
	03.65.Fd (Algebraic methods )

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