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Rearrangementsof the Haar system that preserve BMO

Published online by Cambridge University Press:  01 November 1997

PFX Müller
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Abstract

Let $\cal D $ denote the collection of dyadic intervals in the unit interval. Let $\tau$ be a rearrangement of the dyadic intervals. We study the induced operator

$$ Th_I = h_{\tau(I)}$$

where $h_I$ is the $L^{\infty}$ normalized Haar function. We find geometric conditions on $\tau$ which are necessary and sufficient for $T$ to be bounded on $BMO$. We also characterize the rearrangements of the $L^p$ normalized Haar system in $L^p.$

1991 Mathematics Subject Classification: 42C20, 43A17, 47B38.

Keywords

Haar systemrearrangementsCarleson measuresBMO
Type
Research Article
Information
Proceedings of the London Mathematical Society , Volume 75 , Issue 3 , November 1997 , pp. 600 - 618
Copyright
London Mathematical Society 1997

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