The Maximal Function and Square Function Control the Variation: An Elementary Proof

Abstract

In this note we prove the following good-λ inequality, for r>2, all λ > 0, δ ∈ (0, 12 ) \[ \ Vr(f) > 3 λ ; M(f) ≤ δ λ\ ≤ 4 \s(f) > δ λ\ + δ2 (1+16r-2)2 · \ Vr(f) > λ\, \] where M(f) is the martingale maximal function, s(f) is the conditional martingale square function. This immediately proves that Vr(f) is bounded on Lp, 1 < p <∞ and moreover is integrable when the maximal function is.