Abstract.
In this paper we prove that the von Neumann algebra generated by q-gaussians is not injective as soon as the dimension of the underlying Hilbert space is greater than 1. Our approach is based on a suitable vector valued Khintchine type inequality for Wick products. The same proof also works for the more general setting of a Yang-Baxter deformation. Our techniques can also be extended to the so called q-Araki-Woods von Neumann algebras recently introduced by Hiai. In this latter case, we obtain the non injectivity under some asssumption on the spectral set of the positive operator associated with the deformation.
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References
Bozejko, M.: Completely positive maps on Coxeter groups and the ultracontractivity of the q-Ornstein-Uhlenbeck semigroup, Banach Center Publications, vol.43, (1999), pp. 87-93; Institute of Mathematics, Polish Academy of Sciences, Warsawa
Bozejko, M.: Ultracontractivity and strong Sobolev inequality for q-Ornstein-Uhlenbeck semigroup (-1<q<1), Infinite Dimensional Analysis, Quantum Probability and Related Topics. 2, 203–220 (1998)
Bozejko, M., Kummerer, B., Speicher, R.: q-Gaussian processes: Non-commutative and classical aspects. Commun. Math. Phys. 185, 129–154 (1997)
Bozejko, M., Speicher, R.: Completely positive maps on Coxeter groups, deformed commutation relations, and operator spaces. Math. Ann. 300, 97–120 (1994)
Bozejko, M., Speicher, R.: Interpolation between bosonic and fermionic relation given by generalized Brownian motions. Math. Z. 222, 135–160 (1996)
Buchholz, A.: Free Khintchine-Haagerup inequality. Proc. AMS
Buchholz, A.: L∞-Khintchine-Bonami inequality in the free probability. Quantum Probability, Banach Center Publications 43, 105–109 (1998)
Choi, M-D., Effros, E.: Injectivity and Operator spaces. Journal of functional analysis 24, 156–209 (1977)
Christensen, E., Sinclair,~A.: Representations of completely bounded multilinear operators. Journal of Functional analysis 72, 151–181 (1987)
Effros, E., Ruan, Z.-J.: Operators spaces. Oxford University Press, Oxford, 2000
Haagerup, U., Pisier, G.: Bounded linear operators between C*-algebras. Duke Math. J. 71, 889–925 (1993)
Hiai, F.: q-Deformed Araki-Woods algebras. Preprint
Krolak, I.: Wick product for commutation relations connected with Yang-Baxter operators and new constructions of factors. Commun. Math. Phys. 210, 685–701 (2000)
Pisier, G.: An introduction to operator spaces. Cambridge Press. 2003
Pisier, G., Shlyakhtenko, D.: Grothendieck’s Theorem for Operator Spaces. Inventiones Mathematicae 150, 185-217 (2002)
Shlyakhtenko, D.: Free quasi-free states. Pacific J. Math. 177, 329–368 (1997)
Voiculescu, D.: Symmetries of some reduced free product of C*-algebras, Operator Algebras and Ergodic Theory. Lect. Notes in Math. Springer, 1132, 556–588 (1995)
Voiculescu, D., Dykema, K., Nica, A.: Free Random variables. CRM Monograph Series, Vol. 1, Centre Recherches Mathématiques, Université de Montréal, 1992
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Mathematics Subject Classification (2000): 46L65, 46L54
Revised version: 13 January 2004
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Nou, A. Non injectivity of the q-deformed von Neumann algebra. Math. Ann. 330, 17–38 (2004). https://doi.org/10.1007/s00208-004-0523-4
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DOI: https://doi.org/10.1007/s00208-004-0523-4