Journal Name:
- European Journal of Pure and Applied Mathematics
Publication Year:
- 2011
| Author Name | University of Author |
|---|---|
- 3
- English
REFERENCES
[1] P. A. Allen , Ideal theory in semirings, Dissertation, Texas Christian University, 1967.
[2] P. A. Allen , A fundamental theorem of homomorphisms for semirings, Proc. Amer. Math.
Soc. 21, 412-416. 1969.
[3] R. Ameri, Some properties of Zariski topology of multiplication modules, Houston J. of
Math. 38(2), 337-344. 2010.
[4] R. Ameri, On the prime submodules of multiplication modules, Inter. J. of Mathematics
and Mathematical Sciences 27, 1715-1724. 2003.
[5] M. F. Atiyah and I. G. Macdonald, Introduction to Commutative Algebra, Addison Wesley
Publishing Company, 1969.
[6] Z. El-Bast and P. F. Smith, Multiplication modules, Comm. Algebra 16, 755-779. 1988.
[7] J. N. Chaudhari and D. Bonde, On Partitioning And Subtractive Subsemimodules Of
Semimodules Over Semirings, Kyungpook Math. J. 50, 329-336. 2010.
[8] S. Ebrahimi Atani, Multiplication modules and related results, Archivium Mathematicum
40, 407-414. 2004.
[9] S. Ebrahimi Atani, Submodules of multiplication modules, Taiwanese J. of Math. 9(3),
385-396. 2005.
[10] S. Ebrahimi Atani, The ideal theory in quotients of commutative semirings. Glas. Math.
42, 301-308. 2007.
[11] S. Ebrahimi Atani and R. Ebrahimi Atani, Very strong multiplication ideals and the ideal
(I). Glas. Math. 45, 395-406. 2010.
[12] R. Ebrahimi Atani and S. Ebrahimi Atani, Ideal theory in commutative semirings. Bul.
Acad. Stiinte Repub. Mold. Mat. 2, 14-23. 2008.
[13] R. Ebrahimi Atani and S. Ebrahimi Atani, Subsemimodules of semimodules. Bul. Acad.
Stiinte Repub. Mold. Mat. 63, 20-30. 2010.
[14] S. Ebrahimi Atani and R. Ebrahimi Atani, Some remarks on partitioning semirings. An.
St. Univ. Ovidius Constanta 18(1), 49-62. 2010.
[15] S. Ebrahimi Atani and M. Shajari Kohan, A note on finitely generated multiplication
semimodules over commutative semirings. Inter. J. of Algebra 4(8), 389-396. 2010.
[16] J. S. Golan, Semirings and their applications, Kluwer Academic publisher Dordrecht,
1999.
[17] K. Glazek, A Guide to the literature on Semirings and their Applications in Mathematics
and Information Sciences:With Computer Bibliography, Kluwer Acad. Publ., Dodrecht,
2002.
[18] U. Hebisch and H. J. Weinert, Semirings: Algebraic Theory and Applications in the
Computer Science, World Scientific, 1998.
[19] C. P. Lu, Prime submodules of modules, Comment. Math. Univ. St. Paul 33, 61-69. 19840
[20] C. P. Lu, Spectra of modules, Comm. Algebra 23(10), 3741-3752. 1995
[21] C. P. Lu, A module whose prime spectrum has the surjective natural map, Houston J. of
Math. 33(1), 125-143. 2007.
[22] R. Y. McCasland, M. E. Moore and P. F. Smith, On the spectrum of a module over a
commutative ring, Comm. Algebra 25(1), 79-103. 1997.
[23] I. Simon, The nondeterministic complexity of finite automaton, in: Notes, Hermes, Paris,
384-400. 1990.