Singular integral operators and norm ideals satisfying a quantitative variant of Kuroda's condition

A norm ideal C is said to satisfy condition (QK) if there exist constants 0<t<1 and 0<B<∞, such that ∥X^[k]∥_C?Bk^t∥X∥_C for every finite-rank operator X and every k∈N, where X^[k] denotes the direct sum of k copies of X. Let μ be a regular Borel measure whose support is contained in a unit cube Q in Rⁿ and let K_j be the singular integral operator on L²(Rⁿ,μ) with the kernel function (x_j-y_j)/|x-y|², 1?j?n. Let {Q_w:w∈W} be the usual dyadic decomposition of Q, i.e., {Q_w:|w|=?} is the dyadic partition of Q by cubes of the size 2^-?×?×2^-?. We show that if C satisfies (QK) and if ∥∑_w∈W2^|w|μ(Q_w)ξ_w⊗ξ_w∥_C^′<∞, where C^′ is the dual of C⁽⁰⁾ and {ξ_w:w∈W} is any orthonormal set, then K₁,…,K_n∈C^′. This is a very general obstruction result for the problem of simultaneous diagonalization of commuting tuples of self-adjoint operators modulo C.