Direct sums of finite dimensional SL∞n spaces

Abstract

SL∞ denotes the space of functions whose square function is in L∞, and the subspaces SL∞n, n∈N, are the finite dimensional building blocks of SL∞. We show that the identity operator ISL∞n on SL∞n well factors through operators T : SL∞N SL∞N having large diagonal with respect to the standard Haar system. Moreover, we prove that ISL∞n well factors either through any given operator T : SL∞N SL∞N, or through ISL∞N-T. Let X(r) denote the direct sum (Σn∈N0 SL∞n)r, where 1≤ r ≤ ∞. Using Bourgain's localization method, we obtain from the finite dimensional factorization result that for each 1≤ r≤ ∞, the identity operator IX(r) on X(r) factors either through any given operator T : X(r) X(r), or through IX(r) - T. Consequently, the spaces (Σn∈N0 SL∞n)r, 1≤ r≤ ∞, are all primary.