arXiv:1606.03340 Abstract | arXiv Analytics

arXiv:1606.03340 [math.CA]Abstract References Reviews Resources

Sparse domination on non-homogeneous spaces with an application to $A_p$ weights

Published 2016-06-10Version 1

We extend Lerner's recent approach to sparse domination of Calder\'on--Zygmund operators to upper doubling (but not necessarily doubling), geometrically doubling metric measure spaces. Our domination theorem is different from the one obtained recently by Conde-Alonso and Parcet and yields a weighted estimate with the sharp power $\max(1,1/(p-1))$ of the $A_p$ characteristic of the weight.

Comments: 11 pages

Categories: math.CA, math.AP

Subjects: 42B20

Keywords: sparse domination, non-homogeneous spaces, application, geometrically doubling metric measure spaces, sharp power

Related articles: Most relevant | Search more

arXiv:1507.01383 [math.CA] (Published 2015-07-06)

Complete $(p,q)$-elliptic integrals with application to a family of means

Shingo Takeuchi

arXiv:1409.8527 [math.CA] (Published 2014-09-30)

A note on a hypergeometric transformation formula due to Slater with an application

Y. S. Kim, A. K. Rathie, R. B. Paris

arXiv:0912.3010 [math.CA] (Published 2009-12-15)

A Calderon Zygmund decomposition for multiple frequencies and an application to an extension of a lemma of Bourgain

Fedor Nazarov, Richard Oberlin, Christoph Thiele

arXiv Analytics

arXiv:1606.03340 [math.CA]Abstract References Reviews Resources

Sparse domination on non-homogeneous spaces with an application to $A_p$ weights

Links

Toolbox

arXiv:1606.03340 [math.CA]AbstractReferencesReviewsResources

Sparse domination on non-homogeneous spaces with an application to $A_p$ weights

Links

Toolbox

arXiv:1606.03340 [math.CA]Abstract References Reviews Resources