Composition of haar paraproducts: The random case

When is the composition of paraproducts bounded? This is an important, and difficult question. We consider randomized variants of this question, finding nonclassical characterizations. For dyadic interval I, let h_I = h_I⁰ be the L²-normalized Haar function adapted to I, the superscript 0 denoting that it has integral zero. Set h_I¹ = h_I, the superscript 1 denoting a nonzero integral. A (classical dyadic) paraproduct with symbol b is one of the operators. Here, ε, δ ∈ {0, 1}, with one of the two being zero and the other one. We characterize when certain randomized compositions B(b, B(β, ·)) are bounded operators on L²(R), permitting in particular both paraproducts to be unbounded.