$L^p$-boundedness of a singular integral operator

http://dx.doi.org/10.4153/CMB-1998-054-5
Canad. Math. Bull. 41(1998), 404-412

  Published:1998-12-01
 Printed: Dec 1998

Let $b(t)$ be an $L^\infty$ function on $\bR$, $\Omega (\,y')$ be an $H^1$ function on the unit sphere satisfying the mean zero property (1) and $Q_m(t)$ be a real polynomial on $\bR$ of degree $m$ satisfying $Q_m(0)=0$. We prove that the singular integral operator $$ T_{Q_m,b} (\,f) (x)=p.v. \int_\bR^n b(|y|) \Omega(\,y) |y|^{-n} f \left( x-Q_m (|y|) y' \right) \,dy $$ is bounded in $L^p (\bR^n)$ for $1

Keywords:

singular integral, rough kernel, Hardy space singular integral, rough kernel, Hardy space

MSC Classifications:

42B20 show english descriptions Singular and oscillatory integrals (Calderon-Zygmund, etc.) 42B20 - Singular and oscillatory integrals (Calderon-Zygmund, etc.)