Variation of the dyadic maximal function

Abstract

We prove that for the dyadic maximal operator M and every locally integrable function f∈ L1loc( Rd) with bounded variation, also M f is locally integrable and var M f≤ Cdvar f for any dimension d≥1. It means that if f∈ L1loc( Rd) is a function whose gradient is a finite measure then so is ∇ M f and \|∇ M f\|L1( Rd)≤ Cd\|∇ f\|L1( Rd). We also prove this for the local dyadic maximal operator.