Products and Commutators of Martingales in $H_1$ and ${\rm BMO}$

Abstract: Let f := ( f n ) n∈Z + and g := (g n ) n∈Z + be two martingales related to the probability space (Ω, F , P) equipped with the filtration (F n ) n∈Z + . Assume that f is in the martingale Hardy space H 1 and g is in its dual space, namely the martingale BMO. Then the semi-martingale f • g := ( f n g n ) n∈Z + may be written as the sumThe authors prove that L( f, g) is a process with bounded variation and limit in L 1 , while G( f, g) belongs to the martingale Hardy-Orlicz space H log associated with the Orlicz … Show more