Kantorovich type topologies on spaces of measures and convergence of barycenters

IF 1 3区 数学 Q1 MATHEMATICS
K. A. Afonin, V. Bogachev
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引用次数: 1

Abstract

We study two topologies τKR and τK on the space of measures on a completely regular space generated by Kantorovich–Rubinshtein and Kantorovich seminorms analogous to their classical norms in the case of a metric space. The Kantorovich–Rubinshtein topology τKR coincides with the weak topology on nonnegative measures and on bounded uniformly tight sets of measures. A sufficient condition is given for the compactness in the Kantorovich topology. We show that for logarithmically concave measures and stable measures weak convergence implies convergence in the Kantorovich topology. We also obtain an efficiently verified condition for convergence of the barycenters of Radon measures from a sequence or net weakly converging on a locally convex space. As an application it is shown that for weakly convergent logarithmically concave measures and stable measures convergence of their barycenters holds without additional conditions. The same is true for measures given by polynomial densities of a fixed degree with respect to logarithmically concave measures.
测度空间上的Kantorovich型拓扑与重心收敛
在度量空间中,我们研究了完全正则空间上测度空间上的两个拓扑τKR和τK,它们是由Kantorovich - rubinshtein和Kantorovich半模与它们的经典范数相似而产生的。Kantorovich-Rubinshtein拓扑τKR与非负测度和有界一致紧测度集上的弱拓扑一致。给出了Kantorovich拓扑紧性的一个充分条件。我们证明了对数凹测度和稳定测度在Kantorovich拓扑中的弱收敛意味着收敛。我们还得到了Radon测度在局部凸空间弱收敛的序列或网上质心收敛的一个有效验证条件。作为一个应用,证明了对于弱收敛的对数凹测度和稳定测度,它们的质心在没有附加条件的情况下保持收敛。对于相对于对数凹测量的固定度的多项式密度给出的测量也是如此。
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来源期刊
CiteScore
1.90
自引率
10.00%
发文量
124
审稿时长
4-8 weeks
期刊介绍: CPAA publishes original research papers of the highest quality in all the major areas of analysis and its applications, with a central theme on theoretical and numeric differential equations. Invited expository articles are also published from time to time. It is edited by a group of energetic leaders to guarantee the journal''s highest standard and closest link to the scientific communities.
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