由正常算子所决定的双线性泛函的极值定理 |
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引用本文: | 王春晴,严昌桓.由正常算子所决定的双线性泛函的极值定理[J].甘肃农业大学学报,1989(2). |
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作者姓名: | 王春晴 严昌桓 |
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作者单位: | 甘肃教育学院数学系,甘肃农业大学基础部 |
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摘 要: | 本文用复Hilbert空间正常算子理论,导出了由正常算子所决定的双线性泛函的一条极值定理,并给出了它的应用。
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关 键 词: | 正常算子 谱 闭凸包 双线性泛函 |
An intimum theorem Derived from the Bounded Normal Operator |
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Abstract: | In this paper, we obtain the following infimum theorem, Let H be a real Hilbert space and H~#=H+iH denote its complexification, Suppose that N_2H~#|→H~# isa bounded normal linear operator and denoted by the same letter N, the standard extension H~#|→H~# Spec (N)denotes the spectrum of the extension. Thcn we have inf{Re:u∈H~#, ‖u‖=1} =-inf{:u∈H,‖u‖=1} =inf {Re(λ):λ∈spec(N)} in particular, if A=circ (α_1,α_2……a_n) is a n×n real circlant matrix, then inf{: y∈R~n ‖Y‖R~n=1} in{Re(sum from k=1 to n akZ~(k-1)):Z~n=1} Its application can be seen from the problem of ordingry differential equations. |
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