A CONVERSE TO A THEOREM OF KOMLOS FOR CONVEX SUBSETS OF L(1)

被引:5
作者
LENNARD, C
机构
[1] University Of Pittsburgh, Pittsburgh, PA
来源
PACIFIC JOURNAL OF MATHEMATICS | 1993年 / 159卷 / 01期
关键词
D O I
10.2140/pjm.1993.159.75
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
A theorem of Komlos is a subsequence version of the strong law of large numbers. It states that if (f(n))n is a sequence of norm-bounded random variables in L1(mu), where mu is a probability measure, then there exists a subsequence (g(k))k of (f(n))n and f is-an-element-of L1(mu) such that for all further subsequences (h(m))m, the sequence of successive arithmetic means of (h(m))m converges to f almost everywhere. In this paper we show that, conversely, if C is a convex subset of L1(mu) satisfying the conclusion of Komlos' theorem, then C must be L1-norm bounded.
引用
收藏
页码:75 / 85
页数:11
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