On estimate of operator for 0<p<∞

Abstract

Operators such as Carleson operator are known to be bounded on Lp for all 1<p<∞, but not from L1 to weak-L1 and from Hp to Lp for each 0<p≤ 1, the object of this article is to give a estimate for all 0<p<∞. For the weights w satisfying the doubling condition of order q with 0<q<p and the reverse H\"older condition, by using some new functions spaces, we prove that: some sublinear operators are bounded from some subspaces of Lpw to Lpw and to themselves for all 0<p< ∞; in particular, these imply the endpoint estimates from Hpw to Lpw and from Hpw to itself for all 0<p≤ 1; these results are applied to many operators, such as Hardy-Littlewood maximal operator, singular integral operators with rough kernels, Calder\'on commutators, Carleson operator, the polynomial Carleson operator, et al, and give the endpoint versions of classical theorems such as Carleson-Hunt theorem and a conjecture of Stein; Hpw with 0<p≤ 1 is characterized by blocks without vanishing moment conditions; Hpw with 0<p≤ 1 is characterized by a convolution maximal function with a non-smooth kernel.