A note on Littlewood-Paley decompositions with arbitrary intervals

## Abstract We introduce a Littlewood–Paley decomposition related to any sub‐Laplacian on a Lie group __G__ of polynomial volume growth; this allows us to prove a Littlewood–Paley theorem in this general setting and to provide a dyadic characterization of Besov spaces __B__ ^__s,q__^ ~__p__~ (__G_

It is known that given N random subintervals of [0, 1], one can find a disjoint subcollection that covers all of [0, 1] except a set of length about (log N)2/N. We investigate what happens when the distribution of the intervals is biased to favor shorter intervals or intervals close to the endpoints

For controlled comparative trials with matched pairs, in an attempt to improve the asymptotic interval estimator of the relative difference proposed elsewhere, I develop two asymptotic closed-form interval estimators with use of the logarithmic transformation and an idea used for deriving Fieller's