Numerical Ranges of the Real 2×2 Matrices Derived by First Principles

Q4 Mathematics
C. Mladenova, I. Mladenov
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引用次数: 0

Abstract

Here we demonstrate how the very definition of the numerical range leads to its direct geometrical identification. The procedure which we follow can be even slightly refined by making use of the famous Jacobi's method for diagonalization in reverse direction. From mathematical point of view, the Jacobi's idea here is used to reduce the number of the independent parameters from three to two which simplifies significantly the problem. As a surplus we have found an explicit recipe how to associate a Cassinian oval with the numerical range of any real $2\times 2$ matrix. Last, but not least, we have derived their explicit parameterizations.
由第一性原理导出的实数2×2矩阵的数值范围
在这里,我们证明了数值范围的定义如何导致其直接的几何识别。我们所遵循的程序甚至可以通过利用著名的反方向对角化的雅可比方法稍微改进一下。从数学的角度来看,利用雅可比思想将独立参数的数量从3个减少到2个,极大地简化了问题。作为一个盈余,我们已经找到了一个明确的公式,如何将卡西尼椭圆与任何实数2 × 2矩阵的数值范围联系起来。最后,但并非最不重要的是,我们推导了它们的显式参数化。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Geometry, Integrability and Quantization
Geometry, Integrability and Quantization Mathematics-Mathematical Physics
CiteScore
0.70
自引率
0.00%
发文量
4
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