Optimal exponents in weighted estimates without examples

Abstract

We present a general approach for proving the optimality of the exponents on weighted estimates. We show that if an operator T satisfies a bound like \|T\|Lp(w) c\, [w]βAp w ∈ Ap, then the optimal lower bound for β is closely related to the asymptotic behaviour of the unweighted Lp norm \|T\|Lp(Rn) as p goes to 1 and +∞, which is related to Yano's classical extrapolation theorem. By combining these results with the known weighted inequalities, we derive the sharpness of the exponents, without building any specific example, for a wide class of operators including maximal-type, Calder\'on--Zygmund and fractional operators. In particular, we obtain a lower bound for the best possible exponent for Bochner-Riesz multipliers. We also present a new result concerning a continuum family of maximal operators on the scale of logarithmic Orlicz functions. Further, our method allows to consider in a unified way maximal operators defined over very general Muckenhoupt bases.