整片单原函数上连续同态的特征

IF 0.7 3区 数学 Q2 MATHEMATICS
Stefano Pinton, Peter Schlosser
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引用次数: 0

摘要

本文的灵感来自量子力学中出现的一类无穷阶微分算子。在研究量子场方程的超振荡演化时,它们被证明是一种重要工具。无穷阶微分算子自然地作用于全函数空间或超函数空间。最近,在全单元函数空间(即狄拉克算子内核中的函数)上考虑和描述了无穷阶微分算子。本文的重点是描述连续作用于另一类超全同形函数的无穷阶微分算子的特征,这类超全同形函数被称为在克利福德代数中具有值的切片超全同形函数或切片单元函数。这种函数理论具有非常广泛的相关谱理论,在这种情况下,函数理论和算子理论都受到了深入研究。在这里,我们引入了近似阶的概念,并建立了全片单元函数的一些基本性质,这些性质对于作用于全片单元函数的无穷阶微分算子的表征至关重要。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Characterization of continuous homomorphisms on entire slice monogenic functions
This paper is inspired by a class of infinite order differential operators arising in quantum mechanics. They turned out to be an important tool in the investigation of evolution of superoscillations with respect to quantum fields equations. Infinite order differential operators act naturally on spaces of holomorphic functions or on hyperfunctions. Recently, infinite order differential operators have been considered and characterized on the spaces of entire monogenic functions, i.e. functions that are in the kernel of the Dirac operators. The focus of this paper is the characterization of infinite order differential operators that act continuously on a different class of hyperholomorphic functions, called slice hyperholomorphic functions with values in a Clifford algebra or also slice monogenic functions. This function theory has a very reach associated spectral theory and both the function theory and the operator theory in this setting are subjected to intensive investigations. Here we introduce the concept of proximate order and establish some fundamental properties of entire slice monogenic functions that are crucial for the characterization of infinite order differential operators acting on entire slice monogenic functions.
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来源期刊
CiteScore
1.10
自引率
0.00%
发文量
49
审稿时长
6 months
期刊介绍: The Edinburgh Mathematical Society was founded in 1883 and over the years, has evolved into the principal society for the promotion of mathematics research in Scotland. The Society has published its Proceedings since 1884. This journal contains research papers on topics in a broad range of pure and applied mathematics, together with a number of topical book reviews.
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