One-sided Cp estimates via M function
Abstract
We recall that w∈ Cp+ if there exist >0 and C>0 such that for any a<b<c with c-b<b-a and any measurable set E⊂(a,b), the following holds \[ ∫Ew≤ C(|E|(c-b))∫R(M+(a,c))pw<∞. \] This condition was introduced by Riveros and de la Torre as a one-sided counterpart of the Cp condition studied first by Muckenhoupt and Sawyer. In this paper we show that given 1<p<q<∞ if w∈ Cq+ then \[ \|M+f\|Lp(w)\|M,+f\|Lp(w) \] and conversely if such an inequality holds, then w∈ Cp+.
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