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Commutators of Hilbert transforms along monomial curves

Volume 257 / 2021

Tyler Bongers, Zihua Guo, Ji Li, Brett D. Wick Studia Mathematica 257 (2021), 295-311 MSC: Primary 42B35; Secondary 42B99. DOI: 10.4064/sm190915-22-4 Published online: 4 September 2020

Abstract

The Hilbert transforms associated with monomial curves have a natural non-isotropic structure. We study the commutator of such Hilbert transforms and a symbol $b$ and prove the upper bound of this commutator when $b$ is in the corresponding non-isotropic BMO space by using the Cauchy integral trick. We also consider the lower bound of this commutator by introducing a new testing BMO space associated with the given monomial curve, which shows that the classical non-isotropic BMO space is contained in the testing BMO space. We moreover show that the non-zero curvature of such monomial curves is important, since when considering Hilbert transforms associated with lines, the parallel versions of non-isotropic BMO space and testing BMO space have overlaps but do not have containment.

Authors

  • Tyler BongersDepartment of Mathematics & Statistics
    Washington University in Saint Louis
    One Brookings Drive
    Saint Louis, MO 63130-4899, U.S.A.
    e-mail
  • Zihua GuoSchool of Mathematical Sciences
    Monash University
    Melbourne, VIC 3800, Australia
    e-mail
  • Ji LiDepartment of Mathematics
    Macquarie University
    Sydney, NSW 2109, Australia
    e-mail
  • Brett D. WickDepartment of Mathematics & Statistics
    Washington University in Saint Louis
    One Brookings Drive
    Saint Louis, MO 63130-4899, U.S.A.
    e-mail

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