根据一致Fredholm指标性质定义了一种新的谱集, 利用该谱集给出了Hilbert空间中有界线性算子满足(ω1)性质的充要条件. 此外, 研究了hypercyclic算子(或supercyclic算子)和(ω1)性质之间的关系, 同时给出了hypercyclic算子与supercyclic算子新的判定方法.
In this paper, a new spectrum is defined according to the property of the consistent Fredholm index. We establish the sufficient and necessary conditions for a bounded linear operator defined on a Hilbert space that satisfies the property (ω1). In addition, the paper explores the relationship between the property (ω1) and hypercyclic operators (or supercyclic operators). Meanwhile, new conditions for hypercyclic operators and supercyclic operators are given.
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中国综合性科技类核心期刊(北大核心)