On a class of matrices generated by certain generalized permutation matrices and applications |
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| Authors: | Issam Kaddoura Bassam Mourad |
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| Affiliation: | 1. Department of Mathematics, Lebanese International University, Saida, Lebanonissam.kaddoura@liu.edu.lb;3. Department of Mathematics, Faculty of Science, Lebanese University, Beirut, Lebanon |
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| Abstract: | ABSTRACTIn this paper, we study a particular class of matrices generated by generalized permutation matrices corresponding to a subgroup of some permutation group. As applications, we first present a technique from which we can get closed formulas for the roots of many families of polynomial equations with degree between 5 and 10, inclusive. Then, we describe a tool that shows how to find solutions to Fermat's last theorem and Beal's conjecture over the square integer matrices of any dimension. Finally, simple generalizations of some of the concepts in number theory to integer square matrices are presented. |
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| Keywords: | Generalized permutation matrices eigenvalues eigenvectors roots of polynomials non-negative matrices inverse eigenvalue problem matrix number theory |
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