Matrix Quasinorms Induced by Maximal and Minimal Vector Norms

Park Jong-Do

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Matrix Quasinorms Induced by Maximal and Minimal Vector Norms

机译：最大和最小向量范数引起的矩阵拟范数

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In the set of all vector norms in , there exist maximal and minimal complex norms which coincide with the real Euclidean norm in . The purpose of this paper is to introduce new quasinorms defined on complex matrices. These two matrix quasinorms are induced by maximal and minimal complex vector norms. We also prove the dual relation between these two quasinorms.

机译：在中的所有向量规范的集合中，存在与的实际欧几里得规范一致的最大和最小复数规范。本文的目的是介绍在复杂矩阵上定义的新拟准。这两个矩阵准有效值是由最大和最小复数向量范数引起的。我们还证明了这两个准兽之间的双重关系。

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《Journal of Function Spaces and Applications》 |2016年第3期|共页
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Park Jong-Do;
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中图分类数学;
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7. Matrix Quasinorms Induced by Maximal and Minimal Vector Norms [O] . Jong-Do Park 2016

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Matrix Quasinorms Induced by Maximal and Minimal Vector Norms

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