On pointwise products of symmetric quasi Banach spaces and applications

Abstract

Let E1,\;E2 be symmetric quasi Banach function spaces on (0,α)\;(0<α\8). We study some properties of several constructions (the products E1() E2(), the Calderon spaces E1()θ E2()1-θ, the complex interpolation spaces (E1(),E2())θ, the real interpolation method (E1(),E2())θ,p) in the context of noncommutative symmetric quasi Banach spaces. Under some natural assumptions, we prove (E1(), E2())θ=E1()θ E2()1-θ=E1(1θ)() E2(11-θ)()\;(0<θ<1). As application, we extend these result to the noncommutative symmetric quasi Hardy spaces case. We also obtained the real case of Peter Jones' theorem for noncommutative symmetric quasi Hardy spaces.