非可分空间上计数测度的Hun半群结构 The Hun Semigroup Structure of Counting Measures on a Non-Separable Space期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

非可分空间上计数测度的Hun半群结构

引用本文：	宋少强,何远江. 非可分空间上计数测度的Hun半群结构[J]. 中山大学学报(自然科学版), 2000, 39(3): 116-118

作者姓名：	宋少强何远江

作者单位：	中山大学数学系!广东广州510275

摘要：	称局部紧完备度量空间上的Ｒａｄｏｎ测度为强Ｒａｄｏｎ测度，若每个有界集的测度都是有限的，证明了强Ｒａｄｏｎ７计数测度卷积半群是一个稳定的Ｈｕｎ半群。
关键词：	Hun半群强Radon计数测度非可分空间有界集
The Hun Semigroup Structure of Counting Measures on a Non-Separable Space

SONG Shao qiang,HE Yuan jiangDepartmentofMathematics,ZhongshanUniversity,Guangzhou ,China. The Hun Semigroup Structure of Counting Measures on a Non-Separable Space[J]. Acta Scientiarum Naturalium Universitatis Sunyatseni, 2000, 39(3): 116-118

Authors:	SONG Shao qiang HE Yuan jiangDepartmentofMathematics ZhongshanUniversity Guangzhou China

Affiliation:	SONG Shao qiang,HE Yuan jiangDepartmentofMathematics,ZhongshanUniversity,Guangzhou 510 2 75,China

Abstract:	A Radon measure on a locally compact complete metric space is called a strong Radon measure if each bounded set has finite measure.It is proved that the convolution semigroup of strong Radon counting measures is a stable Hun semigroup.

Keywords:	Hun semigroup strong Radon counting measure
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