Asymptotic normality for m-dependent and constrained U-statistics, with applications to pattern matching in random strings and permutations
Abstract
We study (asymmetric) U-statistics based on a stationary sequence of m-dependent variables; moreover, we consider constrained U-statistics, where the defining multiple sum only includes terms satisfying some restrictions on the gaps between indices. Results include a law of large numbers and a central limit theorem. Special attention is paid to degenerate cases where, after the standard normalization, the asymptotic variance vanishes; in these cases non-normal limits occur after a different normalization. The results are motivated by applications to pattern matching in random strings and permutations. We obtain both new results and new proofs of old results.
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