Loading...
PhD
Hashem Esmaeim
Bordbar
no.:
53934
researcher – active in research organisation
ORCID:
0000-0003-3871-217X
Phone number
+38656205830
hashem.bordbar
ung.si
URL https://www.researchgate.net/profile/Hashem-Bordbar
hashem.bordbar
ung.si
URL https://www.researchgate.net/profile/Hashem-Bordbar
Foreign language skills
Research activity
| Code | Science | Field | Subfield |
|---|---|---|---|
| 1.01.00 | Natural sciences and mathematics | Mathematics | |
| 1.01.04 | Natural sciences and mathematics | Mathematics | Algebra |
Keywords
Commutative Algebra, Homological Algebra, Category Theory, Lattice Theory, Ordered Algebra, Hypercompositional Algebra, Coding Theory.
Points
1,671.78
A''
27.8
A'
1,014.75
A1/2
1,108.87
CI10
229
CImax
61
h10
7
A1
5.9
A3
0.01
Data for the last 5 years (citations for the last 10 years) on
October 15, 2025;
Data for score A3 calculation refer to period
2020-2024
(2023)
Citations
Citations for bibliographic records in COBIB.SI that are linked to records in citation databases
| Database | Linked records | Citations | Pure citations | Average pure citations |
|---|---|---|---|---|
| WoS | 42 | 213 | 131 | 3.12 |
| Scopus | 42 | 336 | 222 | 5.29 |
Doctoral dissertations and other final papers
Show
Obtaining results now
Employments
| Type of employment | Research org. | Research group |
|---|---|---|
| Full time employment (100%, RD:100%) |
|
ARIS research and infrastructure programmes
Legend
| no. | Code | Title | Period | Head | No. of publications |
|---|---|---|---|---|---|
| 1. | P2-0103 |
|
1/1/2022 - 12/31/2027 |
|
6,232 |
Biography
I have worked on various branches of algebra throughout my academic career. My research began with Commutative Algebra, Homological Algebra, and Category Theory, approached from the perspective of geometrical algebras during my master's studies. During my Ph.D., I focused on hypercompositional algebraic structures and ordered algebra, with the latter drawing heavily from mathematical logic. In my postdoctoral research, I explored the connections between algebraic structures and coding theory. Currently, I continue my work in algebraic coding theory, specifically studying algebraic structures in arbitrary binary block codes to develop efficient encoding and decoding methods.
We were not given permission by the researcher to publish data.