When is a sum of annihilator ideals an annihilator ideal? GF Birkenmeier, M Ghirati, A Taherifar Communications in Algebra 43 (7), 2690-2702, 2015 | 20 | 2015 |
Intersections of essential (resp. free) maximal ideals of C (X) M Ghirati, A Taherifar Topology and its Applications 167, 62-68, 2014 | 18 | 2014 |
ON THE RINGS OF FUNCTIONS WHICH ARE DISCONTINUOUS ON A FINITE SET Z Gharebaghi, M Ghirati, A Taherifar HOUSTON JOURNAL OF MATHEMATICS 44 (2), 721-739, 2018 | 16 | 2018 |
On strongly essential submodules M Ghirati, OAS Karamzadeh Communications in Algebra® 36 (2), 564-580, 2008 | 14 | 2008 |
Closed ideals in C (X) with different representations F Azarpanah, M Ghirati, A Taherifar HOUSTON JOURNAL OF MATHEMATICS 44 (1), 363-383, 2018 | 8 | 2018 |
When is CF (X)= MβX∖ I (X)? F Azarpanah, M Ghirati, A Taherifar Topology and its Applications 194, 22-25, 2015 | 5 | 2015 |
Rings in which idempotents generate maximal or minimal ideals T Dube, M Ghirati, S Nazari, A Taherifar ALGEBRA UNIVERSALIS 81 (3), 2020 | 3 | 2020 |
Corrigendum to: When is a sum of annihilator ideals an annihilator ideal? GF Birkenmeier, M Ghirati, A Ghorbani, A Naghdi, A Taherifar Communications in Algebra 46 (10), 4174-4175, 2018 | 2 | 2018 |
Homomorphisms and derivations in induced fuzzy -algebras HA Kenary, M Ghirati, C Park, ME Gordji Journal of Inequalities and Applications 2013 (1), 88, 2013 | 2 | 2013 |
When is a sum of annihilator ideals an annihilator ideal?(vol 43, pg 2690, 2015) GF Birkenmeier, M Ghirati, A Ghorbani, A Naghdi, A Taherifar COMMUNICATIONS IN ALGEBRA 46 (10), 4174-4175, 2018 | | 2018 |
NAN-RN HUR-Approximation of a CJA Mapping HA Kenary, H Rezaei, M Ghirati, WG Park | | 2012 |
MR2388023 (2008m: 16007) 16D10 (16L30) M Ghirati, OAS Karamzadeh Comm. Algebra 36 (2), 564-580.1532, 2008 | | 2008 |