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A remark on extrapolation of rearrangement operators on dyadic $H^s$, $0< s \le 1$

Tom 171 / 2005

Stefan Geiss, Paul F. X. Müller, Veronika Pillwein Studia Mathematica 171 (2005), 196-205 MSC: 46B42, 46B70, 47B37. DOI: 10.4064/sm171-2-5

Streszczenie

For an injective map $ \tau $ acting on the dyadic subintervals of the unit interval $[0,1)$ we define the rearrangement operator $ T_s $, $0< s< 2$, to be the linear extension of the map $$ \frac{h_I}{|I|^{1/s}} \mapsto \frac{h_{\tau(I)}}{|\tau(I)|^{1/s}}, $$ where $h_I$ denotes the $L^\infty$-normalized Haar function supported on the dyadic interval $I. $ We prove the following extrapolation result: If there exists at least one $0< s_0< 2$ such that $T_{s_0}$ is bounded on $H^{s_0}$, then for all $0< s< 2 $ the operator $T_{s}$ is bounded on $H^{s}.$

Autorzy

  • Stefan GeissDepartment of Mathematics and Statistics
    P.O. Box 35 (MaD)
    FIN-40014 University of Jyväskylä,
    Finland
    e-mail
  • Paul F. X. MüllerDepartment of Analysis
    J. Kepler University
    A-4040 Linz,
    Austria
    e-mail
  • Veronika PillweinDepartment of Analysis
    J. Kepler University
    A-4040 Linz, Austria

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