On bi-free De Finetti theorems

Freslon, Amaury; Weber, Moritz

doi:10.5802/ambp.353

Freslon, Amaury ¹ ; Weber, Moritz ¹

¹ Saarland University, Fachbereich Mathematik, Postfach 151159, 66041 Saarbrücken, Germany

Annales mathématiques Blaise Pascal, Tome 23 (2016) no. 1, pp. 21-51.

Résumé

We investigate possible generalizations of the de Finetti theorem to bi-free probability. We first introduce a twisted action of the quantum permutation groups corresponding to the combinatorics of bi-freeness. We then study properties of families of pairs of variables which are invariant under this action, both in the bi-noncommutative setting and in the usual noncommutative setting. We do not have a completely satisfying analogue of the de Finetti theorem, but we have partial results leading the way. We end with suggestions concerning the symmetries of a potential notion of $n$ -freeness.

Publié le : 2016-05-10

DOI : 10.5802/ambp.353

Classification : 46L54, 46L53, 20G42
Mots clés : Quantum groups, free probability, De Finetti theorem

Affiliations des auteurs :

Freslon, Amaury ¹ ; Weber, Moritz ¹

¹ Saarland University, Fachbereich Mathematik, Postfach 151159, 66041 Saarbrücken, Germany

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Freslon, Amaury; Weber, Moritz. On bi-free De Finetti theorems. Annales mathématiques Blaise Pascal, Tome 23 (2016) no. 1, pp. 21-51. doi : 10.5802/ambp.353. http://www.numdam.org/articles/10.5802/ambp.353/

Bibliographie
Cité par

[1] Banica, T. Symmetries of a generic coaction, Math. Ann., Volume 314 (1999) no. 4, pp. 763-780 | DOI

[2] Charlesworth, I.; Nelson, B.; Skoufranis, P. Combinatorics of bi-freeness with amalgamation, Comm. Math. Phys., Volume 338 (2015), pp. 801-847 | DOI

[3] Charlesworth, I.; Nelson, B.; Skoufranis, P. On two-faced families of noncommutative random variables, Canad. J. Math., Volume 67 (2015) no. 6, pp. 1290-1325 | DOI

[4] Curran, S. Quantum exchangeable sequences of algebras, Indiana Univ. Math. J., Volume 58 (2009) no. 3, pp. 1097-1125 | DOI

[5] Dykema, K.J.; Köstler, C.; Williams, J.D. Quantum symmetric states on free product C*-algebras (2014) (http://arxiv.org/abs/1305.7293)

[6] Köstler, C.; Speicher, R. A noncommutative de Finetti theorem : invariance under quantum permutations is equivalent to freeness with amalgamation, Comm. Math. Phys., Volume 291 (2009) no. 2, pp. 473-490 | DOI

[7] Liu, W. A noncommutative De Finetti theorem for boolean independence, J. Funct. Anal., Volume 269 (2015) no. 7, pp. 1950-1994 | DOI

[8] Mastnak, M.; Nica, A. Double-ended queues and joint moments of left-right canonical operators on full Fock space, Internat. J. Math., Volume 26 (2014) no. 2 (1550016)

[9] Nica, A.; Speicher, R. Lectures on the combinatorics of free probability, Lecture note series, 335, London Mathematical Society, 2006

[10] Speicher, R. Combinatorial theory of the free product with amalgamation and operator-valued free probability theory, Mem. Amer. Math. Soc., 627, AMS, 1998

[11] Voiculescu, D.V. Free probability for pairs of faces II : $2$ -variables bi-free $R$ -transform and systems with rank $\leq 1$ commutation (2013) (http://arxiv.org/abs/1308.2035)

[12] Voiculescu, D.V. Free probability for pairs of faces I, Comm. Math. Phys., Volume 332 (2014) no. 3, pp. 955-980 | DOI

[13] Wang, S. Quantum symmetry groups of finite spaces, Comm. Math. Phys., Volume 195 (1998) no. 1, pp. 195-211 | DOI

[14] Woronowicz, S.L. Compact quantum groups, Symétries quantiques (Les Houches, 1995) (1998), pp. 845-884

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