BMO from dyadic BMO on the bidisc

doi:10.1112/jlms/jdm114

Journal of the London Mathematical Society Advance Access originally published online on February 26, 2008
Journal of the London Mathematical Society 2008 77(2):524-544; doi:10.1112/jlms/jdm114

This Article

	FREE Full Text (PDF)
	All Versions of this Article: 77/2/524 most recent jdm114v1
	Alert me when this article is cited
	Alert me if a correction is posted

Services

	Email this article to a friend
	Similar articles in this journal
	Alert me to new issues of the journal
	Add to My Personal Archive
	Download to citation manager
	Request Permissions

Google Scholar

	Articles by Pipher, J.
	Articles by Ward, L. A.

Social Bookmarking

	What's this?

BMO from dyadic BMO on the bidisc

Jill Pipher

Department of Mathematics
Brown University
Providence, RI 02912
USA

Lesley A. Ward

Department of Mathematics
Harvey Mudd College
Claremont, CA 91711
USA
ward@math.hmc.edu

We generalize to the bidisc a theorem of Garnett and Jones relatingthe space BMO of functions of bounded mean oscillation to itsmartingale counterpart, dyadic BMO. Namely, translation-averagesof suitable families of dyadic BMO functions belong to BMO.As a corollary, we deduce a biparameter version of a theoremof Burgess Davis connecting the Hardy space H¹ to martingaleH¹. We also prove the analogs of the theorem of Garnett andJones in the one-parameter and biparameter VMO spaces of functionsof vanishing mean oscillation.

The first author was supported by the NSF under grant numberDMS0600389, and by a Mellon Faculty Career Enhancement Grant.The second author was supported by a Mellon Faculty Career EnhancementGrant.

2000 Mathematics Subject Classification 42B35 (primary), 42B30(secondary).

Received May 31, 2006; revised September 3, 2007; published online February 26, 2008.

Add to CiteULike CiteULike Add to Connotea Connotea Add to Del.icio.us Del.icio.us What's this?