Duo modules AÇ Özcan, A Harmanci, PF Smith Glasgow Mathematical Journal 48 (3), 533-545, 2006 | 217 | 2006 |
On⌖-supplemented Modules A Harmanci, D Keskįn, PF Smith Acta Mathematica Hungarica 83, 161-169, 1999 | 132 | 1999 |
On summand sum and summand intersection property of modules M Alkan, A Harmanci Turkish J. Math 26, 131-147, 2002 | 88 | 2002 |
Finite direct sums of CS-modules A Harmanci, PF Smith Houston J. Math 19 (4), 523-532, 1993 | 58 | 1993 |
Generalized semicommutative rings and their extensions M BAŞER, A Harmanci, T Kwak Bulletin of the Korean Mathematical Society 45 (2), 2008 | 51 | 2008 |
Characterization of modules and rings by the summand intersection property and the summand sum property A Hamdouni, AC Ozcan, A Harmanci JP J. Algebra Number Theory Appl 5 (3), 469-490, 2005 | 45 | 2005 |
A characterization of prime submodules Y Tiras, A Harmanci, PF Smith Academic Press Inc, 1999 | 34 | 1999 |
Central Armendariz rings. N Agayev, G Güngöroğlu, A Harmanci, S Halicioğlu Bulletin of the Malaysian Mathematical Sciences Society. Second Series 34 (1 …, 2011 | 33 | 2011 |
Generalized symmetric rings G Kafkas, B Ungor, S Halicioglu, A Harmanci Algebra and Discrete mathematics 12 (2), 2018 | 29 | 2018 |
A generalization of reversible rings H Kose, B Ungor, S Halicioglu, A Harmanci SHIRAZ UNIV, 2014 | 28 | 2014 |
Abelian modules. N Agayev, G Güngöroğlu, A Harmanci, S Halicioğlu Acta Mathematica Universitatis Comenianae. New Series 78 (2), 235-244, 2009 | 28 | 2009 |
On semicommutative modules and rings N Agayev, A Harmanci Kyungpook mathematical journal 47 (1), 21-30, 2007 | 27 | 2007 |
On Rickart modules N Agayev, S Halicioglu, A Harmanci Bull. Iran. Math. Soc 38 (2), 433-445, 2012 | 26 | 2012 |
A generalization of CS-modules C Celik, A Harmanci, PF Smith Communications in Algebra 23 (14), 5445-5460, 1995 | 26 | 1995 |
Two elementary commutativity theorems for rings A Harmanci Acta Mathematica Hungarica 29 (1-2), 23-29, 1977 | 26 | 1977 |
On a class of semicommutative rings T Özen, N Agayev, A Harmancı Department of Mathematics, Kyungpook National University, 2011 | 25 | 2011 |
Rings in which nilpotents belong to Jacobson radical H Chen, O Gurgun, S Halicioglu, A Harmanci An. Stiint. Univ. Al. I. Cuza Iasi. Mat.(NS) 62 (2), 595-606, 2016 | 22 | 2016 |
Rings in which every nilpotent is central B Ungor, S Halicioglu, H Kose, A Harmanci arXiv preprint arXiv:1312.4024, 2013 | 22 | 2013 |
On a class of δ-supplemented modules B Ungor, S Halicioglu, A Harmanci Bull. Malays. Math. Sci. Soc 37 (3), 703-717, 2014 | 20 | 2014 |
Principally supplemented modules U Acar, A Harmanci Albanian Journal of Mathematics 4 (3), 79-88, 2010 | 19 | 2010 |