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Enhanced Cyber security for Software Applications
Authors:
Sivaram RajeyyagariDOI NO:
https://doi.org/10.26782/jmcms.2019.06.00031Abstract:
Every website developed with web technologies. Security is most widely needed for every website. Cyber security is one of the important prevention for websites. This will protect web applications from various attacks. Many attacks are there such as server attacks, DOS attack, data attack and other types of attacks. This will damage the server and social networking sites to disturb the user data. Various drawbacks are addressed in providing security and privacy. To solve these issues, enhanced cyber security is introduced and provided advanced cyber security for web applications and also for servers. The performance of the proposed system is show in resultsKeywords:
Cyber security,cyber crime,cyber ethics,social media,Refference:
The Stable Envelope of Gamma Modules
Authors:
Mehdi S.Abbas, Balsam M.HamadDOI NO:
https://doi.org/10.26782/jmcms.2019.06.00032Abstract:
Presume R represents commutative -ring with identity and each R modules is worked on as unitary R modules. We expand in this paper the notion of the stable extension from the modules theory to that of gamma modules. We have studied the stable envelope S(M) of R - module M, and study the relation istween stable envelope, injective envelope E(M) and quasi-injective envelope Q(M) in the gamma modules, we obtain some results on S(M) where we have shown that S(M) is equal to 𝑎𝑛𝑛𝐸(𝑀): 𝑎𝑛𝑛 (𝑁)M , in case M represents Г − multiplication gamma modules.Keywords:
injective gamma module,quasi-injective gamma module,fully stable gamma module,Г−multiplication Г−moduleI.Abbas.M. S, On fully stable module, Ph. D. thesis, University of Baghdad (1990). II. Balsam m. Hamad, Some remarks on fully stable gamma modules, to appear . III.Abbas .M. S,Saad .S. A, Shallal .E. A, Injective gamma module, Annals of pure and applied mathematics, vol.12, No.185-94, (2016). IV.Ameri .R, and R. Sudeghi, Gamma modules, Ration mathematica 20 (2010), 127-147. V.Abd Al-Hussain. H, Projective gamma modules and some related notions, Ph.D. Thesis ,Univ. of Mustansiriyah, (2017). VI.Barnes .W. E, On the ring of Nabusuwa, Pacin the case ofic J. math. 18 (1966)m 411-422. VII.Estaji.A. A, A. As. Estaji, A. S. Khorasani, S. Baghdari, On multiplication Γ – modules, Ratio mathematica 26 (2014), 21-38. VIII.X. Ma and J.zhan , Some characterizations of regular and semisimple -rings, kyungpook Math.j.,50(2010),pp.411-417. IX.Nobusuwa .N, on a generalization of the ring theory, Osaka J. Math, 1 (1964), 81-89. ,Refference:
I.Abbas.M. S, On fully stable module, Ph. D. thesis, University of Baghdad (1990).
II. Balsam m. Hamad, Some remarks on fully stable gamma modules, to appear .
III.Abbas .M. S,Saad .S. A, Shallal .E. A, Injective gamma module, Annals of pure and applied mathematics, vol.12, No.185-94, (2016).
IV.Ameri .R, and R. Sudeghi, Gamma modules, Ration mathematica 20 (2010), 127-147.
V.Abd Al-Hussain. H, Projective gamma modules and some related notions, Ph.D. Thesis ,Univ. of Mustansiriyah, (2017). VI.Barnes .W. E, On the ring of Nabusuwa, Pacin the case ofic J. math. 18 (1966)m 411-422.
VII.Estaji.A. A, A. As. Estaji, A. S. Khorasani, S. Baghdari, On multiplication Γ – modules, Ratio mathematica 26 (2014), 21-38.
VIII.X. Ma and J.zhan , Some characterizations of regular and semisimple -rings, kyungpook Math.j.,50(2010),pp.411-417.
IX.Nobusuwa .N, on a generalization of the ring theory, Osaka J. Math, 1 (1964), 81-89.
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