___

• [1] Blattner RJ, Cohen M, Montgomery S. Crossed products and inner actions of Hopf algebras. Transactions of the American Mathematical Society 1986; 298: 671-711.
• [2] Brown LG. Stable isomorphism of hereditary subalgebra of C ∗ -algebras. Pacific Journal of Mathematics 1977; 71: 335-348.
• [3] Brown LG, Green P, Rieffel MA. Stable isomorphism and strong Morita equivalence of C ∗ -algebras. Pacific Journal of Mathematics 1977; 71: 349-363.
• [4] Combes F. Crossed products and Morita equivalence. Proceedings of the London Mathematical Society 1984; 49: 289-306.
• [5] Curto RE, Muhly PS, Williams DP. Cross products of strong Morita equivalent C ∗ -algebras. Proceedings of the American Mathematical Society 1984; 90: 528-530.
• [6] Jensen KK, Thomsen K. Elements of KK-theory. Boston, MA, USA: Birkh¨auser, 1991.
• [7] Izumi M. Inclusions of simple C ∗ -algebras. Journal für die reine und angewandte Mathematik 2002; 547: 97-138.
• [8] Kajiwara T, Watatani Y. Jones index theory by Hilbert C ∗ -bimodules and K-Thorey. Transactions of the American Mathematical Society 2000; 352: 3429-3472.
• [9] Kajiwara T, Watatani Y. Crossed products of Hilbert C ∗ -bimodules by countable discrete groups. Proceedings of the American Mathematical Society 1998; 126: 841-851.
• [10] Kodaka K. Equivariant Picard groups of C ∗ -algebras with finite dimensional C ∗ -Hopf algebra coactions. Rocky Mountain Journal of Mathematics 2017; 47: 1565-1615.
• [11] Kodaka K. The Picard groups for unital inclusions of unital C ∗ -algebras. preprint, arXiv: 1712.09499v1, Acta Scientiarum Mathematicarum, to appear.
• [12] Kodaka K, Teruya T. Inclusions of unital C ∗ -algebras of index-finite type with depth 2 induced by saturated actions of finite dimensional C ∗ -Hopf algebras. Mathematica Scandinavica 2009; 104: 221-248.
• [13] Kodaka K, Teruya T. The Rohlin property for coactions of finite dimensional C ∗ -Hopf algebras on unital C ∗ - algebras. Journal of Operator Theory 2015; 74: 329-369.
• [14] Kodaka K, Teruya T. The strong Morita equivalence for coactions of a finite dimensional C ∗ -Hopf algebra on unital C ∗ -algebras. Studia Mathematica 2015; 228: 259-294.
• [15] Kodaka K, Teruya T. The strong Morita equivalence for inclusions of C ∗ -algebras and conditional expectations for equivalence bimodules. Journal of the Australian Mathematical Society 2018; 105: 103-144.
• [16] Kodaka K, Teruya T. Coactions of a finite dimensional C ∗ -Hopf algebra on unital C ∗ -algebras, unital inclusions of unital C ∗ -algebras and the strong Morita equivalence. preprint, arXiv:1706.09530.
• [17] Osaka H, Kodaka K, Teruya T. The Rohlin property for inclusions of C ∗ -algebras with a finite Watatani index. In: de Jeu M, Sivestrov S, Skau C, Tomiyama J. (editors) Operator structures and dynamical systems: Contemporary Mathematics. Providence, USA: American Mathematical Society, 2009.
• [18] Raeburn I, Williams DP. Morita equivalence and continuous -trace C ∗ -algebras. American Mathematical Society, 1998.
• [19] Rieffel MA. C ∗ -algebras associated with irrational rotations. Pacific Journal of Mathematics 1981; 93: 415-429.
• [20] Sweedler ME. Hopf Algebras. New York, NY, USA: Benjamin, 1969.
• [21] Szymański W. Finite index subfactors and Hopf algebra crossed products. Proceedings of the American Mathematical Society 1994; 120: 519-528.
• [22] Szymański W, Peligrad C. Saturated actions of finite dimensional Hopf *-algebras on C ∗ -algebras. Mathematica Scandinavica 1994;75: 217-239.
• [23] Watatani Y. Index for C ∗ -subalgebras. Memoirs of the American Mathematical Society. Providence, USA: American Mathematical Society, 1990.