Spectral decomposition of normal operator in real Hilbert space

IF 0.5 Q3 MATHEMATICS Ufa Mathematical Journal Pub Date : 2017-01-01 DOI:10.13108/2017-9-4-85
M. N. Oreshina
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引用次数: 5

Abstract

We consider normal unbounded operators acting in a real Hilbert space. The standard approach to solving spectral problems related with such operators is to apply the complexification, which is a passage to a complex space. At that, usually, the final results are to be decomplexified, that is, the reverse passage is needed. However, the decomplexification often turns out to be nontrivial. The aim of the present paper is to extend the classical results of the spectral theory for the case of normal operators acting in a real Hilbert space. We provide two real versions of the spectral theorem for such operators. We construct the functional calculus generated by the real spectral decomposition of a normal operator. We provide examples of using the obtained functional calculus for representing the exponent of a normal operator.
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实数Hilbert空间中正规算子的谱分解
我们考虑作用于实希尔伯特空间中的正规无界算子。解决与此类算子相关的谱问题的标准方法是应用复化,这是一个通往复空间的通道。在这种情况下,通常需要对最终结果进行解复化,也就是说,需要进行反向传递。然而,解复化常常是非平凡的。本文的目的是推广谱理论在实希尔伯特空间中正常算子的经典结果。我们为这类算子提供了谱定理的两个实版本。构造了由正规算子的实谱分解生成的泛函演算。我们提供了使用得到的泛函演算来表示普通算子的指数的例子。
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