Interpolation properties of certain classes of net spaces

The paper studies the interpolation properties of net spaces $N_{p,q}(M)$, when $M$ is the set of dyadic cubes in $\mathbb{R}^n$, and also when $M$ is the family of all cubes with parallel faces to the coordinate axes in $\mathbb{R}^n$. It is shown that, in the case when $M$ is the set of dyadic cubes the scale of spaces is closed with respect to the real interpolation method. In the case, when $M$ is the set of all cubes with parallel faces to the coordinate axes, an analogue of the Marcinkiewicz-Calderon theorem on cones of non-negative functions is given.