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引用次数: 0
摘要
在这篇文章中,我们在(局部紧凑)半超群的大背景下介绍并探讨了拓扑可亲性的概念。我们从某些概率度量的收敛性、与概率度量卷积的总变化和某些函数的平移,以及相关度量代数的 F 代数性质等方面,获得了拓扑可亲性的几种静态、遍历和巴拿赫代数特性。我们进一步研究了卷积的限制与子半超群上度量的限制卷积之间的相互作用。最后,我们从父半超群的相应度量代数上获得的某些不变性质出发,讨论并描述了子半超群的拓扑可亲性。这反过来为我们提供了对 J. Wong 在 1980 年提出的一个开放问题的肯定答案。
In this article, we introduce and explore the notion of topological amenability in the broad setting of (locally compact) semihypergroups. We acquire several stationary, ergodic and Banach algebraic characterizations of the same in terms of convergence of certain probability measures, total variation of convolution with probability measures and translation of certain functionals, as well as the F-algebraic properties of the associated measure algebra. We further investigate the interplay between restriction of convolution product and convolution of restrictions of measures on a sub-semihypergroup. Finally, we discuss and characterize topological amenability of sub-semihypergroups in terms of certain invariance properties attained on the corresponding measure algebra of the parent semihypergroup. This in turn provides us with an affirmative answer to an open question posed by J. Wong in 1980.
期刊介绍:
Forum Mathematicum is a general mathematics journal, which is devoted to the publication of research articles in all fields of pure and applied mathematics, including mathematical physics. Forum Mathematicum belongs to the top 50 journals in pure and applied mathematics, as measured by citation impact.