Citing papers

http://scholar.google.ro/citations?user=kc5M8mEAAAAJ&hl=en&oi=ao

Amenable actions of Katz algebras on von Neumann algebras, Rev. Roum. Math. Pures Appl., 35(1990), 2, pp.151-160 (with S. Petrescu

1. M. Enok, J.M. Schwartz, Kac algebras and duality of locally compact groups, Springer-Verlag, Berlin, 1992, pp. 275 [ISBN:0387547452]

Property (T) for Kac algebras, Rev. Math. Roum. Pures Appl., 37(1992), 2, pp.163-178 (with S. Petrescu)

1.M. Enok, J.M. Schwartz, Kac algebras and duality of locally compact groups, Springer-Verlag, Berlin, 1992, pp. 275, [ISBN:0387547452].

2. E. Bedos, R. Conti, L. Tuset, On amenability and co-amenability of algebraic quantum groups and their corepresentations, Canad. J. Math. 57 (2005),1, 17—60 (ISI) .

3. J. Heo, Co-rigidity of groups, von Neumann algebras and Kac algebras, Math. Nachr. 280, No. 1–2, 83 –92 (2007), (cotata ISI) .

4. D. Kyed, P. M. Sołtan, Property (T) and exotic quantum group norms, arXiv:1006.4044v1 [math.OA], 2010, To appear in Journal of Noncommutative Geometry (2011) (ISI) .

5. D. Kyed A cohomological description of property (T) for quantum groups arXiv:1003.5181 J. Functional Analysis.Volume 261, Issue 6, 15 September 2011, 1469-1493.

Strict completely positive linear maps between locally C* -algebras and representations on Hilbert modules, J. London Math. Soc. (2), 66 (2002), no.2, pp.421-432.

1. M. Fragoulopoulou, Topological Algebras with Involution, North-Holland Mathematics Studies, 200. Elsevier Science B.V., Amsterdam, 2005. xvi+495 pp. ISBN: 0-444-52025.

2.T-L. Costache, Reprezentari proiective, Teza de doctorat, Universitatea din Bucuresti, 2009

3. T-L. Costache, On the projective covariant representations of C*-dynamical systems associated with completely multi-positive projective u-covariant maps, U.P.B. Sci. Bull., Series A, Vol. 72(2010), 4, 185-196 (ISI)

4. I..N.. Maliev and M.A.Pliev, Continuity of ring homomorphisms for local C*-algebras, Russian Mathematics (Iz. VUZ), 2011, Vol. 55, No. 8, pp. 28–32, [ISSN 1066-369X].

On the bounded part of a Hilbert module over a locally C*-algebra, Period. Math. Hungar., 45(2002), 1-2, pp. 81-85.

1. M. Fragoulopoulou, Topological Algebras with Involution, North-Holland Mathematics Studies, 200. Elsevier Science B.V., Amsterdam, 2005. xvi+495 pp. ISBN: 0-444-52025-2

Commutative unital Hopf -C*-algebras, Rev. Roum. Math. Pures Appl., 43(1998), 9-10, pp.839-851.

1. M. Fragoulopoulou, Topological Algebras with Involution, North-Holland Mathematics Studies, 200. Elsevier Science B.V., Amsterdam, 2005. xvi+495 pp. ISBN: 0-444-52025-2

Locally von Neumann algebras II, Rend. Circ. Mat. Palermo (2), 51(2002), 1, pp. 84-93.

1. M. Fragoulopoulou, Topological Algebras with Involution, North-Holland Mathematics Studies, 200. Elsevier Science B.V., Amsterdam, 2005. xvi+495 pp. ISBN: 0-444-52025-2

2. Katz, Alexander A; Kushnir, Roman; Ustayev, Mark; On real locally W*- and locally JBW-algebras. Indian J. Math. 51 (2009), supp1, 133--146.

3. Dmitry Sh. Goldstein and Alexander A. Katz, On a local structure in Rickart algebras – definitions and basic properties, International Journal of Functional Analysis, Operator Theory and Applications, 2(2010), 2, 133-168

4. Katz, Alexander A, On local structure in Kaplansky algebras. Definitions and basic properties, arXiv:1012.5196v1 [math.OA] 23 Dec 2010

On Hilbert modules over locally C*-algebras, An. Univ. Bucuresti, Mat., 49 (2000),1, pp. 41- 51.

1. M. Fragoulopoulou, Topological Algebras with Involution, North-Holland Mathematics Studies, 200. Elsevier Science B.V., Amsterdam, 2005. xvi+495 pp. ISBN: 0-444-52025-2

2. K. SHARIFI, Generic properties of module maps and characterizing inverse limits of C*-algebras of compact operators, arXiv:1108.5826v1, to appear in Bulletin of the Malaysian Mathematical Sciences Society (ISI)

On the Cauchy-Schwarz Inequality in a C*-algebra, Math. Reports, 3(53) (2001), 3, pp.243-246,

1. M. Sal Moslehian and L-E Persson, Reverse Cauchy –Schwarz inequalities for positive C*-valued sesquilinear forms, Math. Inequal. Appl. (2009) (ISI)

2. M. S. Moslehian, R. Nakamoto, Y. Seo, A Diaz--Metcalf type inequality for positive linear maps and its applications, Electronic Journal of Linear Algebra (ELA) 22(2011), 179-190 ( ISI)

3. LJ. Arambasic, D. Bakic, M. S. Moslehian A treatment of the Cauchy--Schwarz inequality in C*-modules, J. Math. Anal. Appl. (2011), (ISI)

Completely multi-positive linear maps between locally C*-algebras and representations on Hilbert modules. Studia Math., 172, (2006). 181-196

1. Xu, Tian Zhou Covariant projective representation for covariant completely multi-positive linear maps. (Chinese) Acta Math. Sinica (Chn. Ser.) 51 (2008), no. 2, 357--364.

2. T-L. Costache, Reprezentari proiective, Teza de doctorat, Universitatea din Bucuresti, 2009

On representations associated with completely n-positive linear maps on pro-C*-algebras, (2008) Chinese Annals of Mathematics. Series B, 29 (1), pp. 55-64.

1. Hu, Y., Wang, Q. Ideals in the Roe algebras of discrete metric spaces with coefficients in B(H), Chinese Annals of Mathematics. Series B, 30 (2) (2009), pp. 139-144 (ISI).

2. Duan YJ, Wang Q, Wang XJ, Property A and uniform embeddability of metric spaces under decompositions of finite depth, Chinese Annals of Mathematics. Series B, 31 (2)(2010), 1, pp. 139-144 (ISI).

Representations associated with completely n-positive linear maps between C*-algebras, Stud. Cercet. Stiint. Ser. Mat. 16 (2006), Supplement Proceedings of ICMI 45, Bacau, Sept. 18-20, 2006, 111-122.

1. T-L. Costache, Reprezentari proiective, Teza de doctorat, Universitatea din Bucuresti, 2009

2. T-L. Costache, On the projective covariant representations of C*-dynamical systems associated with completely multi-positive projective u-covariant maps, U.P.B. Sci. Bull., Series A, Vol. 72(2010), 4, 185-196 (ISI)

Covariant representations as-sociated with covariant completely n-positive linear maps betweenC*-algebras, III Workshop on Coverings, Selections and Games in Topology, April 25-29, 2007, Vrnjacka Banja, Serbia.

1. T-L. Costache, Reprezentari proiective, Teza de doctorat, Universitatea din Bucuresti, 2009

Hilbert modules over locally C*-algebras, Editura Universitatii din Bucuresti, 2006

1. M. Haralampidou, Structure theory of tensor product locally H*-algebras, Rocky Mountain Journal of Mathematics (to appear ) (ISI)

2. I.N.Maliev and M.A.Pliev, Continuity of ring homomorphisms for local C*-algebras, Russian Mathematics (Iz. VUZ), 2011, Vol. 55, No. 8, pp. 28–32, [ISSN 1066-369X].

3. K. SHARIFI, Generic properties of module maps and characterizing inverse limits of C*-algebras of compact operators, arXiv:1108.5826v1, to appear in Bulletin of the Malaysian Mathematical Sciences Society (ISI)

Dilations on Hilbert C*- modules for C*-dynamical systems, BSG Proc. 14, Geometry Balkan Press 2007, 81-86.

1. T-L. Costache, Extensions on twisted crossed products of completely positive invariant projective u-covariant multi-linear maps, BSG Proc. 17, Geometry Balkan Press 2010, 56-67

2. T-L. Costache, M. Zamfir, M. Olteanu On projective regular representations of discrete groups and their infinite tensor products,Applied Sciences, 13(2011), 30-35.

Bounded module maps between Hilbert modules over locally C*-algebras, Acta Math. Univ. Comenian, 74(2005), 71-79.

1. L. Palacios, M. Haralampidou, C. Signoret, Multipliers in Topological Algebras with involution,Functional Analysis Valencia 2010, June 7-12, 2010, Universidad de Valencia, Universidad Politécnica de Valencia, Valencia, Spain

Locally von Neumann algebras, Bull. Math. Soc. Sci. Math. Roumanie, 42(90), (1999),1, pp.51-64,

1. Katz, Alexander A; Kushnir, Roman; Ustayev, Mark; On real locally W*- and locally JBW-algebras. Indian J. Math. 51 (2009), supp1, 133--146.

2. Dmitry Sh. Goldstein and Alexander A. Katz, On a local structure in Rickart algebras – definitions and basic properties, International Journal of Functional Analysis, Operator Theory and Applications, 2(2010), 2, 133-168 (Mathematical Reviews, MathSciNet, and Zentralblatt fur Mathematik databases)

3. Katz, Alexander A , On local structure in Kaplansky algebras. Definitions and basic properties, arXiv:1012.5196v1 [math.OA] 23 Dec 2010

Crossed products of locally C*-algebras, Rocky Mountain J. Math. 37(2007), 5, 1623–1644.

1.I.N.Maliev and M.A.Pliev, Continuity of ring homomorphisms for local C*-algebras, Russian Mathematics (Iz. VUZ), 2011, Vol. 55, No. 8, pp. 28–32, [ISSN 1066-369X].

Morita eqivalence for locally C*-algebras, Bull. London Math. Soc. 36(2004), 6, 802–810.