Title of article
Random Lazy Random Walks on Arbitrary Finite Groups
Author/Authors
Hildebrand، Martin نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2001
Pages
-1018
From page
1019
To page
0
Abstract
For a sequence of independent identically distributed Euclidean random vectors, we prove a compact Law of the iterated logarithm when Finitely many maximal terms are omitted from the partial sum. With probability one, the limiting cluster set of the appropriately operator normed partial sums is the closed unit Euclidean ball. The result is proved under the hypotheses that the random vectors belong to the Generalized Domain of Attraction of the multivariate Gaussian law and satisfy a mild integrability condition. The integrability condition characterizes how many maximal terms must be omitted from the partial sum sequence.
Keywords
finite groups , Random walks , Uniform distribution
Journal title
JOURNAL OF THEORETICAL PROBABILITY
Serial Year
2001
Journal title
JOURNAL OF THEORETICAL PROBABILITY
Record number
108334
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