Preferred Language
Articles
/
7Rf0-I8BVTCNdQwCkIFH
Artin Exponent for the special linear group SL(2,pk)where pk = 9,25 and 27
...Show More Authors

Publication Date
Tue Jan 01 2013
Journal Name
College Of Education Journal, Al-mustansiriyah University
Artin Exponent for the Projective Special linear group PSL(2, pk) where pk = 5,7,11,13 and 19
...Show More Authors

Publication Date
Sat May 01 2010
Journal Name
College Of Education Journal, Al-mustansiriyah University
Artin Characters for the Special Linear Group SL(2,p) where p is a prime number  19
...Show More Authors

Publication Date
Sun Jan 02 2011
Journal Name
College Of Education Journal, Al-mustansiriyah University
The cyclic Decomposition of PSL(2,pk) where pk = 5, 7, 11, 13, 17 and 19
...Show More Authors

Publication Date
Tue Aug 04 2009
Journal Name
Journal Of The College Of Basic Education, Al-mustansiriyah University
cyclic decomposition of SL(2,p) where p=9, 25 and 27
...Show More Authors

Publication Date
Tue Mar 30 2021
Journal Name
Journal Of Interdisciplinary Mathematics
Computations for the special linear group (2, 49)
...Show More Authors

View Publication
Scopus (9)
Crossref (7)
Scopus Clarivate Crossref
Publication Date
Sun Jan 01 2023
Journal Name
Mathematical Statistician And Engineering Applications
Artin Indicatorfor the Groups SL(2,53 ) and SL(2,55 )
...Show More Authors

Publication Date
Mon Apr 20 2020
Journal Name
Ibn Al-haitham Journal For Pure And Applied Sciences
Result for the group SL(2,172)
...Show More Authors

Publication Date
Thu Jul 20 2023
Journal Name
Ibn Al-haitham Journal For Pure And Applied Sciences
Score for the Group SL(2,38)
...Show More Authors

        The set of all (n×n) non-singular matrices over the field F. And this set forms a group under the operation of matrix multiplication. This group is called the general linear group of dimension  over the field F, denoted by . The determinant of these matrices is a homomorphism from  into F* and the kernel of this homomorphism was the special linear group and denoted by  Thus  is the subgroup of  which contains all matrices of determinant one.

The rationally valued characters of the rational representations are written as a linear combination of the induced characters for the groups discussed in this paper. We find the Artin indicator for this group after studying the rationally valued characters of the rational

... Show More
View Publication Preview PDF
Crossref (3)
Crossref
Publication Date
Sat Jan 20 2024
Journal Name
Ibn Al-haitham Journal For Pure And Applied Sciences
Outcome for the group SL(2,57)
...Show More Authors

The set of all (n×n) non-singular matrices over the field F this set forms a group under the operation of matrix multiplication. This group is called the general linear group of dimension  over the field F, denoted by . The determinant of these matrices is a homomorphism from  into F* and the kernel of this homomorphism was the special linear group and denoted by  Thus  is the subgroup of  which contains all matrices of determinant one.

The rational valued characters of the rational representations written as a linear combination of the induced characters for the groups  discuss in this paper and find the Artin indicator for this group after study the rational valued characters of the rational representations and the induce

... Show More
View Publication
Crossref
Publication Date
Sat Oct 08 2022
Journal Name
Mathematical Statistician And Engineering Applications
Illation for the Groups SL(2,112 ) and SL(2,132 )
...Show More Authors