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首页> 外文期刊>Journal of Operator Theory >A PRE-ORDER AND AN EQUIVALENCE RELATION ON SCHUR CLASS FUNCTIONS AND THEIR INVARIANCE UNDER LINEAR FRACTIONAL TRANSFORMATIONS
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A PRE-ORDER AND AN EQUIVALENCE RELATION ON SCHUR CLASS FUNCTIONS AND THEIR INVARIANCE UNDER LINEAR FRACTIONAL TRANSFORMATIONS

机译:线性分数变换下舒尔类函数的阶数与等价关系及其不变性

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摘要

Motivated by work of Yu.L. Shmul'yan a pre-order and an equivalence relation on the set of operator-valued Schur class functions are introduced and the behavior of Redheffer linear fractional transformations (LFTs) with respect to these relations is studied. In particular, it is shown that Redheffer LFTs preserve the equivalence relation, but not necessarily the pre-order. The latter does occur under some additional assumptions on the coefficients in the Redheffer LFT.
机译:受Yu.L.介绍了Shmul'yan算子值Schur类函数集上的前序和等价关系,并研究了Redheffer线性分数变换(LFT)关于这些关系的行为。特别是,它表明Redheffer LFT保留了等价关系,但不一定保留前序。后者的确在Redheffer LFT中的系数的一些附加假设下发生。

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