On a question of Pietch

Abstract

The main result is that a finite dimensional normed space embeds isometrically in p if and only if it has a discrete Levy p-representation. This provides an alternative answer to a question raised by Pietch, and as a corollary, a simple proof of the fact that unless p is an even integer, the two-dimensional Hilbert space 22 is not isometric to a subspace of p. The situation for q2 with q≠ 2 turns out to be much more restrictive. The main result combined with a result of Dor provides a proof of the fact that if q≠ 2 then q2 is not isometric to a subspace of p unless q=p. Further applications concerning restrictions on the degree of smoothness of finite dimensional subspaces of p are included as well.