共查询到18条相似文献,搜索用时 140 毫秒
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主要给出了k-拟-*-A算子的一些性质,若T是k-拟-*-A算子,则T有SVEP.作为此性质的应用,证明了若T是k-拟-*-A算子,则B-Weyl谱的谱映射定理成立;若T或T*是k-拟-*-A算子,则广义Browder定理对T成立. 相似文献
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若T或T~*是无穷维可分的Hilbert空间H上的代数κ-拟-A类算子,则Weyl定理对任意的f∈H(σ(T))成立,其中H(σ(T))为σ(T)的开邻域上解析函数的全体.若T~*是代数κ-拟-A类算子,则a-Weyl定理对f(T)成立。还证明了若T或T~*是代数κ-拟-A类算子,则Weyl谱与本质近似点谱的谱映射定理对f(T)成立. 相似文献
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设T是一个Hilbert空间算子,若满足T~(*k)(|T~2|-|T~*|~2)T~k≥0,则称T为k-拟-*-A类算子.著名的Fuglede-Putnam定理:若AX=XB,则A~*X=XB~*,其中A和B是正规算子.该文中,首先证明了若T是一个压缩的k-拟-*-A类算子,则T有非平凡的不变子空间或者T是真压缩算子,且正算子D=T~(*k)(|T~2|-|T~*|~2)T~k是强稳定压缩算子;其次证明了k-拟-*-A类算子不是超循环算子;最后证明了若X是Hilbert-Schmidt算子,A和(B~*)~(-1)是k-拟-*-A类算子,满足AX=XB,则A~*X=XB~*. 相似文献
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引入了拟绝对-*-k-仿正规算子,获得了拟绝对-*-k-仿正规算子的一个充要条件.并证明了拟绝对-*-k-仿正规算子在0≤k≤1上是有限上升的,作为此性质的应用,证明了若T是拟绝对-*-k-仿正规算子,其中0≤k≤1,则Weyl谱和本质近似点谱的谱映射定理成立.最后证明了若T是拟绝对-*-k-仿正规算子,其中0≤k≤1,则σ_(ja)(T)\{0}=σ_a(T)\{0}. 相似文献
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若T有单值延伸性且T为reguloid算子,则Weyl定理对f(T)成立,其中f∈H(σ(T)),而当T~*有单值延伸性且T是reguloid算子,α-Weyl定理对f(T)成立,其中,f∈H(σ(T)),作为定理应用,我们证明了Weyl定理对解析M-亚正规算子成立,α-Weyl定理对解析余亚正规算子成立。 相似文献
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黄超成 《数学年刊A辑(中文版)》1986,(4)
设T为Hilbert空间上的k-拟亚正常算子,即满足T~(*k)(T~*T-TT~*)T~k≥0。本文讨论了这类算子的局部谱性质。主要结果是:(ⅰ)如果S是另一个k-拟亚正常算子,S与T拟相似,则σ(T)=σ(S);(ⅱ)对复平面上的任何闭子集σ,T的相应于δ的谱子空间必为闭子空间,并且成立。此外,我们还讨论了等式成立的条件。 相似文献
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主要给出了*-A(n)算子的一些性质:若T是*-A(n)算子,则T有谱的连续性;若T是*-A(n)算子,则T的近似点谱和联合近似点谱是相等的;若T,S是*-A(n)算子,则T,S是Weyl算子当且仅当TS是Wey1算子. 相似文献
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Shanti Prasanna 《Proceedings Mathematical Sciences》1982,91(1):59-63
Using the notion of thin sets we prove a theorem of Weyl type for the Wolf essential spectrum ofT ∈β (H). *Further we show that Weyl’s theorem holds for a restriction convexoid operator and consequently modify some results of
Berberian. Finally we show that Weyl’s theorem holds for a paranormal operator and that a polynomially compact paranormal
operator is a compact perturbation of a diagnoal normal operator. A structure theorem for polynomially compact paranormal
operators is also given. 相似文献
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用σ(T)和σ_w)分别表示算子T的谱与weyl谱,π_(00)(T)={λ∈isoσ(T),0dimN(T-λI)∞},若σ(T)\σ_w(T)■π_(00)(T)成立,则就认为T满足Browder定理.主要研究了2×2上三角算子矩阵的Browder定理在紧摄动下的稳定性,并给出了判定稳定性的等价条件. 相似文献
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关于广义Aluthge变换的谱性质的研究 总被引:2,自引:0,他引:2
设T∈H(H),T=U|T|是算子T的极分解,则定义T^λ=|T|^λU|T|^1-λ和T^λ(*)=|T*|^λU|T*|^1-λ,(其中0〈λ〈1)分别为算子的广义Aluthge变换和广义*-Aluthge变换.本文中主要研究了三者之间的几种谱的关系.同时,还证明了算子T满足修正的Weyl定理当且仅当弘满足修正的Weyl定理当且仅当T^λ(*)满足修正的Weyl定理.最后证明了算子T满足a—Weyl定理当且仅当T^λ满足a—Weyl定理. 相似文献
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In this paper, we study various properties of algebraic extension of *-A operator. Specifically, we show that every algebraic extension of *-A operator has SVEP and is isoloid. And if T is an algebraic extension of *-A operator, then Weyl's theorem holds for f(T), where f is an analytic functions on some neighborhood of σ(T) and not constant on each of the components of its domain. 相似文献
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In this note we show that if either T or T* is totally *-paranormal
then Weyls theorem holds for f(T) for every f
, and also a-Weyls theorem holds for f(T) if T is totally *-paranormal. We prove that if either
T or T* is *-paranormal then the spectral mapping theorem holds for the
Weyl spectrum and for the essential approximate point spectrum. 相似文献
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We call T ∈ B(H) consistent in Fredholm and index (briefly a CFI operator) if for each B ∈ B(H),T B and BT are Fredholm together and the same index of B,or not Fredholm together.Using a new spectrum defined in view of the CFI operator,we give the equivalence of Weyl’s theorem and property (ω) for T and its conjugate operator T* .In addition,the property (ω) for operator matrices is considered. 相似文献
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We call T C B(H) consistent in Fredholm and index (briefly a CFI operator) if for each B ∈ B(H), TB and BT are Fredholm together and the same index of B, or not Fredholm together. Using a new spectrum defined in view of the CFI operator, we give the equivalence of Weyl's theorem and property (ω) for T and its conjugate operator T^*. In addition, the property (ω) for operator matrices is considered. 相似文献