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Medientyp:
E-Artikel
Titel:
SU(p,q) coherent states and a Gaussian de Finetti theorem
Beteiligte:
Leverrier, Anthony
Erschienen:
AIP Publishing, 2018
Erschienen in:
Journal of Mathematical Physics, 59 (2018) 4
Sprache:
Englisch
DOI:
10.1063/1.5007334
ISSN:
0022-2488;
1089-7658
Entstehung:
Anmerkungen:
Beschreibung:
<jats:p>We prove a generalization of the quantum de Finetti theorem when the local space is an infinite-dimensional Fock space. In particular, instead of considering the action of the permutation group on n copies of that space, we consider the action of the unitary group U(n) on the creation operators of the n modes and define a natural generalization of the symmetric subspace as the space of states invariant under unitaries in U(n). Our first result is a complete characterization of this subspace, which turns out to be spanned by a family of generalized coherent states related to the special unitary group SU(p, q) of signature (p, q). More precisely, this construction yields a unitary representation of the noncompact simple real Lie group SU(p, q). We therefore find a dual unitary representation of the pair of groups U(n) and SU(p, q) on an n(p + q)-mode Fock space. The (Gaussian) SU(p, q) coherent states resolve the identity on the symmetric subspace, which implies a Gaussian de Finetti theorem stating that tracing over a few modes of a unitary-invariant state yields a state close to a mixture of Gaussian states. As an application of this de Finetti theorem, we show that the n × n upper-left submatrix of an n × n Haar-invariant unitary matrix is close in total variation distance to a matrix of independent normal variables if n3 = O(m).</jats:p>