Free and projective generalized multinormed spaces
Abstract
The paper investigates free and projective -spaces, where is a given normed space. These spaces form a far-reaching generalization of known -multinormed spaces; in particular, if , the -spaces can be considered as -multinormed spaces, based on arbitrary -finite measure spaces (for "canonical" -multinormed spaces, with the counting measure). We first describe a "naturally appearing" functor, based on paving with contractively complemented finite dimensional subspaces. This finite dimensionality is essential; it permits us to describe a free -space for this functor. As a corollary, we obtain a wide variety of projective -spaces. For "nice" (such as the space of simple -integrable functions on a measure space), we obtain a full description of projective -spaces.
Cite
@article{arxiv.2109.01786,
title = {Free and projective generalized multinormed spaces},
author = {A. Ya. Helemskii and T. Oikhberg},
journal= {arXiv preprint arXiv:2109.01786},
year = {2021}
}