These pages are not updated anymore. For the current production of this journal, please refer to http://www.jstor.org/journals/0003486x.html.
Annals of Mathematics, II. Series Vol. 151, No. 1, pp. 3557 (2000) 

The bilinear maximal functions map into $L^p$ for $2/3 < p \leq 1$Michael T. LaceyReview from Zentralblatt MATH: The paper contains some results concerning operators of the form: $$Mfg(x)= \sup_{t>0} \int^t_{t}f(x \alpha y)g(x y)dy,$$ $$T^* fg(x)= \sup_{\varepsilon< \delta}\Biggl\int_{\varepsilon<y< \delta} f(x\alpha y)g(x y) K(y) dy\Biggr$$ and socalled ``model sums''. Reviewed by A.Smajdor Keywords: bilinear maximal functions; bisublinear maximal operators; model sums Classification (MSC2000): 47G10 46E30 Full text of the article:
Electronic fulltext finalized on: 8 Sep 2001. This page was last modified: 21 Jan 2002.
© 2001 Johns Hopkins University Press
