IPM
30
YEARS OLD

## “Amir Hashemi”

Tel:  (+98-313)3913635
Fax:  (+98-313) 3912602
Email:

### IPM Positions

Resident Researcher, School of Mathematics
(2013 - Present
(Resident in Isfahan))

### Non IPM Affiliations

Associate Professor of Isfahan University of Technology

### Related Papers

 1. Computing the resolution regularity of bi-homogeneous idealsJ. Symb. Comput. (2020), Doi: 10.1016/j.jsc.2019.12.001  [abstract]
 2. Degree upper bounds for involutive basesMathematics in Computer Science (MCS) (Accepted) [abstract]
 3. Computing all border bases for ideals of pointsJ. Algebra Appl. 18 (2019), # 23 Pages  [abstract]
 4. Computation of Pommaret bases using syzygiesLNCS 11077 (2018), 51-66  [abstract]
 5. Deterministic genericity for polynomial idealsJournal of Symbolic Computation 86 (2018), 20-50  [abstract]
 6. Dimension-dependent upper bounds for Grobner bases ( In: Proceedings of the 2017 ACM on Inernational Symposium on symbolic and Algebraic Computation (ISSAC'17))[abstract]
 7. Grobner systems conversionMath. Comput. Sci. 11 (2017), 61-77  [abstract]
 8. Parametric FGLM algorithmJournal of Symbolic Computation 82 (2017), 38-56  [abstract]
 9. A note on dynamic Grobner bases computationLNCS 9890 (2016), 276-288  [abstract]
 10. Improved computation of involutive basesLNCS 9890 (2016), 58-72  [abstract]
 11. Lie algebras of infinitesimal CR automorphisms of weighted homogeneous and homogeneous CR-generic submanifolds of CNFilomat 30 (2016), 1387-1411  [abstract]
 12. Regular chains under linear changes of coordinates and applicationsLecture Notes in Computer Science 9301 (2015), 30-44  [abstract]
 13. Simple proofs of some theorems in resultant theoryMiskolc Math. Notes 16 (2015), 205-211  [abstract]
 14. Applications of differential algebra for computing Lie algebras of infinitesimal CR-automrphismsScience China Mathematics 57 (2014), 1811-1834  [abstract]
 15. Deterministically computing reduction numbers of polynomial idealsLNCS 8660 (2014), 188-203  [abstract]
 16. An improvement of Rosenfeld-Grobner algorithmLNCS 8592 (2014), 466-471  [abstract]
 17. Effective computation of radical of ideals and its application to invariant theoryLNCS 8592 (2014), 382-389  [abstract]
 18. Solving linear systems of equations over integers with Grobner basesActa Arith. 163 (2014), 261-270  [abstract]
 19. M. Behboodi and A. Hashemi (Joint with R. Beyranvand and H. Khabazian) Classification of finite rings: Theory and algorithmCzechoslovak Math. J. 64 (2014), 641-658  [abstract]
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