测度空间上的Lévy-Prohorov距离

doi:10.13371/j.cnki.chin.q.j.m.2017.01.005

数学季刊 ›› 2017, Vol. 32 ›› Issue (1): 42-48.doi: 10.13371/j.cnki.chin.q.j.m.2017.01.005

测度空间上的Lévy-Prohorov距离

Department of Basic Courses,Qingdao Binhai University

收稿日期:2015-06-20 出版日期:2017-03-30 发布日期:2020-10-26
作者简介:QU Li-min(1979-), female(Manzu), native of Xinbin, Liaoning, a lecturer of Qingdao Binhai University, engages in nonlinear analysis; ZHU Ji-yun(1980-), female, native of Jiaozhou, Shandong, a lecturer of Qingdao Binhai University, engages in image processing and reconstruction.

L\acute{e}vy-Prohorov Metric on the Measure Space

Department of Basic Courses,Qingdao Binhai University

Received:2015-06-20 Online:2017-03-30 Published:2020-10-26
About author:QU Li-min(1979-), female(Manzu), native of Xinbin, Liaoning, a lecturer of Qingdao Binhai University, engages in nonlinear analysis; ZHU Ji-yun(1980-), female, native of Jiaozhou, Shandong, a lecturer of Qingdao Binhai University, engages in image processing and reconstruction.

摘要/Abstract

摘要： Under the premise of infinitely many pure strategies, by defining the new LP* metric, striking an equivalence of topology and weak* topology, we prove that the existence of the essential component.

关键词: L\acute{e}vy-Prohorov metric, the essential component, metric, Nash equilibrium

Abstract: Under the premise of infinitely many pure strategies, by defining the new LP* metric, striking an equivalence of topology and weak* topology, we prove that the existence of the essential component.

Key words: L\acute{e}vy-Prohorov metric, the essential component, metric, Nash equilibrium

中图分类号:

O189.11

曲立敏 , 朱季云. 测度空间上的Lévy-Prohorov距离[J]. 数学季刊, 2017, 32(1): 42-48.

QU Li-min, ZHU Ji-yun. L\acute{e}vy-Prohorov Metric on the Measure Space[J]. Chinese Quarterly Journal of Mathematics, 2017, 32(1): 42-48.

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测度空间上的Lévy-Prohorov距离

L\acute{e}vy-Prohorov Metric on the Measure Space

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