用卢卡斯数计算圆周矩阵逆值和特征值的高效方法

S. Guritman, Jaharuddin, Teduh Wulandari, Siswandi
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引用次数: 0

摘要

本文用一种简单的方法明确地提出了包括行列式在内的逆矩阵,以及具有入口卢卡斯数的圆周矩阵的特征值,从而可以高效地构建它们的计算。行列式和逆的表述方法只是简单地应用了基本行或列运算的理论,可以统一到一个定理中。同时,对于特征值的表述,通过观察卢卡斯序列的特性和应用复平面内单位圆的循环群特性,简化了最近已知的一般循环矩阵的表述。然后,高效地构建了这些公式的算法。一些实施事实也表明,该算法运行速度非常快,能够计算大尺寸的循环矩阵。
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An Efficient Method for Computing the Inverse and Eigenvalues of Circulant Matrices with Lucas Numbers
In this article, the inverse including the determinant, and the eigenvalues of circulant matrices with entry Lucas numbers are formulated explicitly in a simple way so that their computations can be constructed efficiently. The formulation method of the determinant and inverse is simply applying the theory of elementary row or column operations and can be unified in one theorem. Meanwhile, for the eigenvalues formulation, the recently known formulation in the case of general circulant matrices is simplified by observing the specialty of the Lucas sequence and applying cyclic group properties of unit circles in the complex plane. Then, an algorithm of those formulations is constructed efficiently. From some  implementation facts also showed that the algorithms performed very fast and was able to calculate large size of circulant matrices.
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