Restricted weak type inequalities for the one-sided Hardy-Littlewood maximal operators in higher dimensions

Abstract

We give a quantitative characterization of the pairs of weights (w,v) for which the dyadic version of the one-sided Hardy-Littlewood maximal operator satisfies a restricted weak (p,p) type inequality, for 1≤ p<∞. More precisely, given any measurable set E0 the estimate \[w(\x∈ Rn: M+,d(XE0)(x)>t\)≤ C[(w,v)]Ap+,d(R)ptpv(E0)\] holds if and only if the pair (w,v) belongs to Ap+,d(R), that is \[|E||Q|≤ [(w,v)]Ap+,d(R)(v(E)w(Q))1/p\] for every dyadic cube Q and every measurable set E⊂ Q+. The proof follows some ideas appearing in [Sheldy Ombrosi, Weak weighted inequalities for a dyadic one-sided maximal function in Rn, Proc. Amer. Math. Soc. 133 (2005), no.~6, 1769--1775]. We also obtain a similar quantitative characterization for the non-dydadic case in R2 by following the main ideas in [L.~Forzani, F.~J. Mart\'n-Reyes, and S.~Ombrosi, Weighted inequalities for the two-dimensional one-sided Hardy-Littlewood maximal function, Trans. Amer. Math. Soc. 363 (2011), no.~4, 1699--1719].