Dyadic analysis of compactness on product spaces

Abstract

We develop the compactness theory of multilinear singular integrals on product spaces using a modern point of view. The first main result is a compact T1 theorem for multilinear Calder\'on--Zygmund operators on product spaces. More specifically, we prove that a multilinear singular integral operator T on product spaces can be extended to a compact multilinear operator from Lp1(w1p1) × ·s × Lpm(wmpm) to Lp(wp) for all exponents 1p = Σj=1m 1pj>0 with p1, …, pm ∈ (1, ∞] and for all weights w ∈ Ap(Rn1 × Rn2) if the following hypotheses are satisfied: (H1) T admits a compact full kernel representation, (H2) T admits a compact partial kernel representation, (H3) T satisfies the weak compactness property, (H4) T satisfies the diagonal CMO condition, and (H5) T satisfies the product CMO condition. This is a multilinear compact extension of Journ\'e's T1 theorem on product spaces. The second main result establishes the mean continuity of commutators [b, T]α on weighted Lebesgue spaces as above, which can be viewed as a substitution of compactness because the compactness of [b, T]α is equivalent to b constant when T is a non-degenerate bi-parameter singular integral. Our main tools include multilinear bi-parameter dyadic representation, multilinear extrapolation, multilinear interpolation, and Kolmogorov--Riesz compactness criterion.

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