TITLE:
On the Deepest Fallacy in the History of Mathematics: The Denial of the Postulate about the Approximation Nature of a Simple-Iteration Method and Iterative Derivation of Cramer’s Formulas
AUTHORS:
Albert Iskhakov, Sergey Skovpen
KEYWORDS:
System of Linear Algebraic Equations (SLAE), Nilpotent Matrix, Unipotent Matrix, Eigenvalue Assignment, Finite Iterative Process, Cramer’s Formulas
JOURNAL NAME:
Applied Mathematics,
Vol.10 No.6,
June
17,
2019
ABSTRACT: Contrary to the opinion about approximation nature of a simple-iteration method, the exact solution of a system of linear algebraic equations (SLAE) in a finite number of iterations with a stationary matrix is demonstrated. We present a theorem and its proof that confirms the possibility to obtain the finite process and imposes the requirement for the matrix of SLAE. This matrix must be unipotent, i.e. all its eigenvalues to be equal to 1. An example of transformation of SLAE given analytically to the form with a unipotent matrix is presented. It is shown that splitting the unipotent matrix into identity and nilpotent ones results in Cramer’s analytical formulas in a finite number of iterations.