Abstract. The Hausdorff operators defined by suitable signed measures on $R=(-\infty,\infty )$ are shown to be bounded on $L^p(R^n)$, on the real Hardy space $H^1(R^n)$, and on the space of bounded mean oscillation $BMO(R^n)$. An example is given that negatively resolves a related conjecture of Móricz.
AMS Subject Classification
(1991): 47B38, 46A30
Keyword(s):
Fourier transform,
Riesz transforms,
Hausdorff operator,
Ces?ro operator,
Lebesgue spaces,
Hardy Spaces,
Bounded Mean Oscillation
Received December 14, 2001, and in revised form June 6, 2002. (Registered under 2904/2009.)
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