[1] M.K. Bennett and D.J. Foulis, Effect algebras and unsharp quantum logics, Foundation of Physics 24, (1994),
1331- 1352.
[2] D. Butnariu and P. Klement, Triangular Norm-Based Measures and Games with Fuzzy Coalitions, Kluwer Academic
Publisher, (1993).
[3] A. Dinola, A. Dvurensku, M. Hycko and C. Manara, Entropy on effect algebras with the Riesz decomposition
property I: Basic properties, Kybernetika, 2, (2005), 143-160.
[4] D. Dumitrescu, Measure-preserving transformation and the entropy of a fuzzy partition, 13th Linz Seminar on
Fuzzy Set Theory, (1991), 25-27.
[5] D. Dumitrescu, Hierarchical pattern classification, Fuzzy Sets and Systems, 28, (1988), 145-162.
[6] D. Dumitrescu, A note on fuzzy information theory, Stud. Univ. Babes - Bolyai Math, 33, (1988), 65-69.
[7] D. Dumitrescu, Fuzzy partitions with the connectives T infinity, S infinity, Fuzzy Sets and Systems, 47, (1992),
193-195.
[8] D. Dumitrescu, Fuzzy measures and the entropy of fuzzy partitions, J. Math. Anal. Appl, 176, (1993), 359-373.
[9] D. Dumitrescu, Entropy of a fuzzy process, Fuzzy Sets and Systems, 55, (1993), 169-177.
[10] D. Dumitrescu, Fuzzy conditional logic, Fuzzy Sets and Systems, 68, (1994), 171-179.
[11] D. Dumitrescu, Entropy of fuzzy dynamical systems, Fuzzy Sets and Systems, 70, (1995), 45-57.
[12] A. Dvurecenskij and S. Pulmannova, New trends in quantum structures, Kluwer Acad.
Publ.,Dordrecht/Boston/London and Ister Science, Bratislava, 2000.
[13] M.Ebrahimi, Generators of probability dynamical systems, Differential Geometry-Dynamical Systems, 8, (2006),
90-97.
[14] M.Ebrahimi and N. Mohamadi, The entropy function on an algebraic structure with infinte partition and mpreserving
transformation generators, Applied Sciences, 12, (2010), 48-63.
[15] M.Ebrahimi and U. Mohamadi, m-Generators of fuzzy Dynamical Systems, Cankaya University journal of Science
and Engineering, 9, (2012), 67-182.
[16] M.Ebrahimi and B.Mosapour, The concept of entropy on D-posets, cankaya University Journal of Science and
Engineering, 10, (2013), 137-151.
[17] L.Weihua and W. Junde, A uniqueness problem of the sequence product on operator effect algebra E(H), J. Phys.
A: Math. Theor, 42, (2009), 185206-185215 .
[18] P.Malicky and B. Riecan, On the entropy of dynamical systems. In: Proc. Conference Ergodic Theory and Related
Topics II, Georgenthal 1986, Teubner, Leipzig, (1987), 135-138.
[19] E. PAP, Pseudo-additive measures and their applications, In: Handbook of Measure Theory, Vol. I, II, North-
Holland, Amsterdam, (2002), 1403-1468.
[20] J. Petroviciova, On the entropy of partitions in product MV algebras, Soft Computing, 4, (2000), 41- 44.
[21] J. Petroviciova, On the entropy of dynamical systems in product MV algebras. Fuzzy Sets and Systems, 121,
(2001), 347-351.
[22] K. Ravindran, On a structure theory of effect algebras, PhD. Thesis, Kansas State University, Manhattan, (1996).
[23] Sh. Jun and W. Junde, Not each sequential effect algebra is sharply dominating. Phys. Letter A., 373, (2009),
1708-1712.
[24] Sh. Jun and W. Junde, Remarks on the sequential effect algebras,Report. Math. Phys, 63, (2009), 441-446.
[25] Sh. Jun and W. Junde, Sequential product on standard effect algebra E(H), J. Phys. A: Math. Theor, 44, (2009).
CUJSE 12, No. 1 (2015) Entropy of Countable Partitions on Effect Algebras 39
[26] W. Jia-Mei, W. JunDe and Ch. Minhyung, Mutual information and relative entropy of sequential effect algebras,
Theor. Phys. (Beijing, China), 54, (2010), 215-218.
[27] J. Wang, J. Wu and M. Cho, Entropy of partitions on sequential efect algebras, Communications in Theoretical
Physics, 53, (2010), 399-402.
[28] Y. Zhao and Z. Ma, Conditional entropy of partitions on quantum logic, Communications in Theoretical Physics,
48, (2007), 11-13.
Thank you for copying data from http://www.arastirmax.com
