Quantum symmetry of graph $C^{\ast }$-algebras at\cr critical inverse temperature

We give a notion of quantum automorphism group of graph C*-algebras without sink at critical inverse temperature. This is defined to be the universal object of a category of CQG's having a linear action in the sense of [11] and preserving the KMS state at critical inverse temperature. We show that this category for a certain KMS state at critical inverse temperature coincides with the category introduced in [11] for a class of graphs. We also introduce an orthogonal filtration on Cuntz algebra with respect to the unique KMS state and show that the category of CQG's preserving the orthogonal filtration coincides with the category introduced in this paper.

[1]  A. Rennie,et al.  The noncommutative geometry of graph C*-algebras I: The index theorem , 2005, math/0508025.

[2]  Wolfgang Krieger,et al.  A class ofC*-algebras and topological Markov chains , 1980 .

[3]  Pierre Tarrago,et al.  Unitary Easy Quantum Groups: the free case and the group case , 2015, 1512.00195.

[4]  Spectral triples for AF C*-algebras and metrics on the cantor set , 2003, math/0309044.

[5]  Valerie Isham,et al.  Non‐Negative Matrices and Markov Chains , 1983 .

[6]  Shuzhou Wang,et al.  Free products of compact quantum groups , 1995 .

[7]  Kazuhisa Maehara,et al.  Non Commutative Geometry I , 2017 .

[8]  Teodor Banica Quantum automorphism groups of homogeneous graphs , 2003 .

[9]  KMS states on the C∗-algebras of finite graphs , 2012, 1205.2194.

[10]  Debashish Goswami,et al.  Quantum Group of Orientation preserving Riemannian Isometries , 2008, 0806.3687.

[11]  S. Woronowicz,et al.  Compact matrix pseudogroups , 1987 .

[12]  Debashish Goswami Quantum Group of Isometries in Classical and Noncommutative Geometry , 2007, 0704.0041.

[13]  G. Pedersen,et al.  Some $C^*$-dynamical systems with a single KMS state. , 1978 .

[14]  Soumalya Joardar Quantum symmetries of classical manifolds and their cocycle twists , 2015 .

[15]  Adam G. Skalski,et al.  Quantum symmetry groups of C*‐algebras equipped with orthogonal filtrations , 2011, 1109.6184.

[16]  Shuzhou Wang,et al.  Quantum Symmetry Groups of Finite Spaces , 1998, math/9807091.

[17]  Julien Bichon,et al.  Quantum automorphism groups of finite graphs , 1999, math/9902029.

[18]  A. Mandal,et al.  Quantum symmetry of graph C∗-algebras associated with connected graphs , 2017, Infinite Dimensional Analysis, Quantum Probability and Related Topics.

[19]  Simon Schmidt,et al.  Quantum Symmetries of Graph C *-algebras , 2017, Canadian Mathematical Bulletin.

[20]  Notes on Compact Quantum Groups , 1998, math/9803122.