On Hollow Lifting Modules N Orhan Ertas, D Keskin Tütüncü, R Tribak Taiwanese Journal of Mathematics 11 (2), 545-568, 2007 | 49 | 2007 |
Rings whose modules have maximal or minimal projectivity domain C Holston, SR López-Permouth, NO Ertaş Journal of Pure and Applied Algebra 216 (3), 673-678, 2012 | 35 | 2012 |
Characterization of Lifting Modules in terms of Cojective Modules and the class of B(M,X) N Orhan, D Keskin Tütüncü International Journal of Mathematics 16 (6), 647-660, 2005 | 11 | 2005 |
Generalization of Weak Lifting Modules N Orhan Ertas, D Keskin Tütüncü Soochow Journal of Mathematics 32 (1), 71-76, 2006 | 9 | 2006 |
CCSR Modules and Weak Lifting Modules D Keskin Tütüncü, N Orhan East-West Journal of Mathematics 5 (1), 89-96, 2003 | 9 | 2003 |
A Variation of Coretractable Modules NİL ORHAN ERTAŞ, D KESKİN TÜTÜNCÜ, R Tribak Bulletin of theMalayasian Math. Sci. Soc., 2018 | 8* | 2018 |
On fully idempotent modules DK Tütüncü, NO Ertaş, R Tribak, PF Smith Communications in Algebra 39 (8), 2707-2722, 2011 | 7 | 2011 |
Mixed injective modules DK Tütüncü, SH MOHAMED, NILO ERTAŞ Glasgow Mathematical Journal 52 (A), 111-120, 2010 | 7 | 2010 |
Two generalizations of lifting modules NO Ertas, R Tribak Int. J. Algebra 13, 599-612, 2009 | 4 | 2009 |
Lifting modules with indecomposable decompositions N Er, NO Ertas Communications in Algebra® 36 (2), 395-404, 2008 | 4 | 2008 |
On weak Rickart modules D Keskin Tütüncü, N Orhan Ertaş, R Tribak Journal of Algebra and Its Applications 16 (09), 1750165, 2017 | 3 | 2017 |
Fully Idempotent and Multiplication Modules NO ERTAS | 3 | 2014 |
Direct Summands of Delta supplemented Modules N Orhan, D Keskin Tütüncü, R Tribak Algebra Colloquium 14 (4), 620-625, 2007 | 3* | 2007 |
Some Characterizations of Lifting Modules in terms of Preradicals N Orhan Hacettepe Journal od Mathematics and Statistics 32, 13-15, 2003 | 3 | 2003 |
Some variations of projectivity NO Ertaş, R Tribak Journal of Algebra and its Applications 21 (12), 2250236, 2022 | 2 | 2022 |
Some rings for which the cosingular submodule of every module is a direct summand DK TÜTÜNCÜ, NİLO ERTAŞ, PF Smith, R Tribak Turkish Journal of Mathematics 38 (4), 649-657, 2014 | 2 | 2014 |
Rings whose cyclic modules are direct sums of extending modules P AYDOĞDU, N Er, NİLO ERTAŞ Glasgow Mathematical Journal 54 (3), 605-617, 2012 | 2 | 2012 |
Some properties of intersection graph of a module with an application of the graph of ℤ n NO Ertaş, S Sürül Journal of Discrete Mathematical Sciences and Cryptography, 2020 | 1 | 2020 |
RELATION BETWEEN ALMOST PROJECTIVE MODULES AND PROJECTIVE MODULES NO ERTAŞ PROCEEDING BOOK, 108, 2019 | 1 | 2019 |
On dual Rickart modules and weak dual Rickart modules DK Tütüncü, NO Ertas, R Tribak Algebra and Discrete Mathematics 25 (2), 2018 | 1 | 2018 |