Endpoint estimates and weighted norm inequalities for commutators of fractional integrals

• Autores: Alberto Fiorenza, David Cruz-Uribe
• Localización: Publicacions matematiques, ISSN 0214-1493, Vol. 47, Nº 1, 2003, págs. 103-132
• Idioma: inglés
• DOI: 10.5565/publmat_47103_05
• Enlaces
  • Texto completo
• Resumen

  • We prove that the commutator [b, Iα], b ∈ BMO, Iα the fractional integral operator, satisfies the sharp, modular weak-type inequality |{x∈Rn : |[b, Iα]f(x)| > t}|≤C Ψ Rn B bBMO |f(x)| tdx, where B(t) = tlog(e + t) and Ψ(t)=[tlog(e + tα/n)]n/(n−α). These commutators were first considered by Chanillo, and our result complements his. The heart of our proof consists of the pointwise inequality, M#([b, Iα]f)(x) ≤ CbBMO [Iαf(x) + Mα,Bf(x)], where M# is the sharp maximal operator, and Mα,B is a generalization of the fractional maximal operator in the scale of Orlicz spaces. Using this inequality we also prove one-weight inequalities for the commutator; to do so we prove one and two-weight norm inequalities for Mα,B which are of interest in their own right.