Weak similarity orbit of (log)‐self‐similar Markov semigroups on the Euclidean space

IF 1.5 1区 数学 Q1 MATHEMATICS
P. Patie, Rohan Sarkar
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引用次数: 3

Abstract

We start by identifying a class of pseudo‐differential operators, generated by the set of continuous negative definite functions, that are in the weak similarity (WS) orbit of the self‐adjoint log‐Bessel operator on the Euclidean space. These WS relations turn out to be useful to first characterize a core for each operator in this class, which enables us to show that they generate a class, denoted by P$\mathcal {P}$ , of non‐self‐adjoint C0$\mathcal {C}_0$ ‐contraction positive semigroups. Up to a homeomorphism, P$\mathcal {P}$ includes, as fundamental objects in probability theory, the family of self‐similar Markov semigroups on R+d$\mathbb {R}_+^d$ . Relying on the WS orbit, we characterize the nature of the spectrum of each element in P$\mathcal {P}$ that is used in their spectral representation which depends on analytical properties of the Bernstein‐gamma functions defined from the associated negative definite functions, and, it is either the point, residual, approximate or continuous spectrum. We proceed by providing a spectral representation of each element in P$\mathcal {P}$ which is expressed in terms of Fourier multiplier operators and valid, at least, on a dense domain of a natural weighted L2$\mathbf {L}^{2}$ ‐space. Surprisingly, the domain is the full Hilbert space when the spectrum is the residual one, something which seems to be noticed for the first time in the literature. We end up the paper by presenting a series of examples for which all spectral components are computed explicitly in terms of special functions or recently introduced power series.
欧几里德空间上(log)‐自相似马尔可夫半群的弱相似轨道
我们首先识别一类伪微分算子,该算子由一组连续负定函数生成,位于欧几里得空间上自伴对数贝塞尔算子的弱相似性(WS)轨道上。事实证明,这些WS关系有助于首先刻画该类中每个算子的核心,这使我们能够证明它们生成了一个非自伴C0$\mathcal的类,用P$\mathcal{P}$表示{C}_0$收缩正半群。作为同胚,P$\mathcal{P}$包括R+d$\mathbb上的自相似马尔可夫半群族,作为概率论的基本对象{R}_+^d$。根据WS轨道,我们表征了P$\mathcal{P}$中每个元素的光谱性质,该光谱用于其光谱表示,这取决于由相关的负定函数定义的Bernstein‐gamma函数的分析性质,并且它是点谱、残差谱、近似谱或连续谱。我们继续提供P$\mathcal{P}$中每个元素的谱表示,该谱表示用傅立叶乘子算子表示,并且至少在自然加权L2$\mathbf{L}^{2}$空间的稠密域上有效。令人惊讶的是,当谱是残差时,域是完整的希尔伯特空间,这似乎是文献中第一次注意到的。最后,我们给出了一系列例子,其中所有谱分量都是根据特殊函数或最近引入的幂级数明确计算的。
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来源期刊
CiteScore
2.90
自引率
0.00%
发文量
82
审稿时长
6-12 weeks
期刊介绍: The Proceedings of the London Mathematical Society is the flagship journal of the LMS. It publishes articles of the highest quality and significance across a broad range of mathematics. There are no page length restrictions for submitted papers. The Proceedings has its own Editorial Board separate from that of the Journal, Bulletin and Transactions of the LMS.
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