期刊论文详细信息
Journal of Mathematics and Statistics
Number of Non-Unique Minors (of VariousOrders) and Elements in the Calculation of General Determinants | Science Publications
Patrick Marchisella1  Gurudeo Anand Tularam1 
关键词: Factorial terms;    mathematical proof;    theoretical studies;    linear algebra;   
DOI  :  10.3844/jmssp.2012.373.376
学科分类:社会科学、人文和艺术(综合)
来源: Science Publications
PDF
【 摘 要 】

Problem statement: Many distinct properties of determinants have been studied and are known, yet a considerable number of properties still need further examination. This study investigates the number of minors (of various orders) and elements of a matrix A contained in the expansion of the general determinant of A, irrespective of the independence, principality and distinctness of such minors and elements. Approach: A mathematical proof based approach is taken. Minors of all orders and elements in the calculations of general determinants of matrices of sizes 2×2, 3×3, 4×4 and 5×5 respectively, are considered. Results: Two general expressions involving factorial terms are found: the first being equivalent to the number of minors of various orders found in the analysis of the considered matrices (mentioned above) and the second being equivalent to the number of elements found in the same analysis. Proofs are then presented showing that the expressions hold in the general case of a matrix of size n×n. Conclusion: The results of this study present, with proof, expressions for the total number of minors (of various orders) and elements, respectively, in the general determinant of a matrix of size n×n, irrespective of the independence, principality and distinctness of such minors and elements. Scope for further theoretical study, with applications in applied mathematics and the physical and computer sciences is also indicated.

【 授权许可】

Unknown   

【 预 览 】
附件列表
Files Size Format View
RO201912010160626ZK.pdf 41KB PDF download
  文献评价指标  
  下载次数:4次 浏览次数:25次