Abstract
We study Rademacher chaos indexed by a sparse set which has a fractional combinatorial dimension. We obtain tail estimates for finite sums and a normal limit theorem as the size tends to infinity. The tails for finite sums may be much larger than the tails of the limit.
Citation
Ron Blei. Svante Janson. "Rademacher chaos: tail estimates versus limit theorems." Ark. Mat. 42 (1) 13 - 29, April 2004. https://doi.org/10.1007/BF02432908
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