抽象左有限理论:模型算子方法、实例、分数索波列夫空间和插值理论

Christoph Fischbacher, Fritz Gesztesy, Paul Hagelstein, Lance Littlejohn
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引用次数: 0

摘要

我们使用模型算子方法和希尔伯特空间中自相关算子的谱定理,以简单明了的方式推导出抽象左有限理论的基本结果。我们用各种具体的例子,包括希尔伯特空间的尺度、分数索博廖夫空间和算子的(严格)正分数幂域,运用插值理论,充分说明了这一理论。特别是,我们明确地描述了$L^2(\mathbb{R})$\big($中谐振子算子的正幂域,以及$L^2\big(\mathbb{R}.中赫米特算子的正幂域;e^{-x^2}dx)\big)\big)$ 中的赫米特算子的正幂次(绝对值)。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Abstract Left-Definite Theory: A Model Operator Approach, Examples, Fractional Sobolev Spaces, and Interpolation Theory
We use a model operator approach and the spectral theorem for self-adjoint operators in a Hilbert space to derive the basic results of abstract left-definite theory in a straightforward manner. The theory is amply illustrated with a variety of concrete examples employing scales of Hilbert spaces, fractional Sobolev spaces, and domains of (strictly) positive fractional powers of operators, employing interpolation theory. In particular, we explicitly describe the domains of positive powers of the harmonic oscillator operator in $L^2(\mathbb{R})$ $\big($and hence that of the Hermite operator in $L^2\big(\mathbb{R}; e^{-x^2}dx)\big)\big)$ in terms of fractional Sobolev spaces, certain commutation techniques, and positive powers of (the absolute value of) the operator of multiplication by the independent variable in $L^2(\mathbb{R})$.
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