Computing the number of distinct fuzzy subgroups for the nilpotent p-Group of D_2^n × C_4 SA Adebisi, M Ogiugo, M EniOluwafe International J. Math. Combin 1, 86-89, 2020 | 20 | 2020 |
An explicit formula for the number of distinct fuzzy subgroups of the cartesian product of the Dihedral group of order 2^n with a cyclic group of order 2 SA Adebisi, M EniOluwafe Universal J. of Mathematics and Mathematical Sciences 13 (1), 1-7, 2020 | 10 | 2020 |
Classifying a class of the fuzzy subgroups of the alternating groups A_n M Ogiugo, M EniOluwafe IMHOTEP: African Journal of Pure and Applied Mathematics 4 (1), 27-33, 2017 | 10 | 2017 |
THE NUMBER OF DISTINCT FUZZY SUBGROUPS FOR THE ABELIAN STRUCTURE: ℤ_𝟒 × ℤ_𝟐^𝒏− 𝟏, n> 2 SA Adebisi, M Ogiugo, M EniOluwafe Transactions of the Nigerian Association of Mathematical Physics 11, 5-6, 2020 | 8* | 2020 |
Counting Subgroups of nonmetacyclic groups of type: D_2^n-1 x C_2; n ≥ 3. M EniOluwafe IMHOTEP: African Journal of Pure and Applied Mathematics 2 (1), 25-27, 2015 | 7 | 2015 |
The Fuzzy Subgroups for the Abelian Structure Z_8 x Z_2^n , n >2. SA Adebisi, M Ogiugo, M EniOluwafe Journal of the Nigerian Mathematical Society 39, 167-171, 2020 | 6 | 2020 |
On the p-Groups of the Algebraic Structure of D_2^n × C_8 SA Adebisi, M Ogiugo, M EniOluwafe Mathematical Combinatorics 3, 102-105, 2020 | 5 | 2020 |
Exhibition of Normal Distribution in Finite p-Groups. SA Adebisi, M EniOluwafe American Journal of Mathematics and Statistics 7 (4), 166-168, 2017 | 5 | 2017 |
The Abelian Subgroup: ℤ_p × ℤ_p × ℤ_p^n , p is Prime and n ≥ 1 SA Adebisi, M EniOluwafe Progress in Nonlinear Dynamics and Chaos 7 (1), 43-45, 2019 | 4* | 2019 |
The fuzzy subgroups for the nilpotent (p-group) of (D_2^3 x C_2^m) for m≥ 3 SA Adebisi, M Ogiugo, M EniOluwafe Journal of fuzzy extension and applications 3 (3), 212-218, 2022 | 3 | 2022 |
The generalized quarternion p-group of order 2^n: Discovering the Fuzzy subgroups SA Adebisi, M EniOluwafe International Journal of Fuzzy Mathematical Archive 18 (2), 65-69, 2020 | 3 | 2020 |
The Explicit Formula for the Number of the Distinct Fuzzy Subgroups of the Cartesian product of the Dihedral Group of Order 2^n with a Cyclic Group of Order eight. SA Adebisi, M Ogiugo, M EniOluwafe Intern. J. Fuzzy Mathematical Archive 18 (1), 41-43, 2020 | 3 | 2020 |
A New Equivalence Relation for the Classification of Fuzzy Subgroups of Symmetric S_4. ME Ogiugo, M EniOluwafe Transactions of the Nigerian Association of Mathematical Physics 6, 168-172, 2018 | 3 | 2018 |
Counting Subgroups of Finite Non-metacyclic 2-Groups having no Elementary Abelian Subgroup of Order 8. M EniOluwafe IOSR Journal of Mathematics 10 (5), 31-32, 2014 | 3 | 2014 |
The abelian groups of large order: perspective from (fuzzy) subgroups of finite p-groups SA Adebisi, M Ogiugo, M EniOluwafe Mathematics and Computer Science 6 (3), 45, 2021 | 2 | 2021 |
The modular group of the form: M_2^n × C_2 SA Adebisi, M EniOluwafe International Journal of Fuzzy Mathematical Archive 18 (2), 85-89, 2020 | 2 | 2020 |
2-Dimensional subgroups of the quasidihedral group of order 2^n with a cyclic group of order 2 SA Adebisi, M EniOluwafe International Journal of Fuzzy Mathematical Archive 18 (2), 71-73, 2020 | 2 | 2020 |
On counting subgroups for a class of finite nonabelian p-groups and related problems O Oluwafunmilayo, M EniOluwafe IMHOTEP: African Journal of Pure and Applied Mathematics 4 (1), 34-43, 2017 | 2 | 2017 |
On counting subgroups for a class of finite nonabelian p-groups and related problems OO Olapade, M EniOluwafe | 2 | 2017 |
Units of Burnside Rings of Elementary Abelian 2-Groups. MA Alawode Journal of Algebra 237, 487-500, 2001 | 2 | 2001 |