Common subspaces of Lp-spaces

Abstract

For n≥ 2, p<2 and q>2, does there exist an n-dimensional Banach space different from Hilbert spaces which is isometric to subspaces of both Lp and Lq? Generalizing the construction from the paper "Zonoids whose polars are zonoids" by R.Schneider we give examples of such spaces. Moreover, for any compact subset Q of (0,∞) \2k, k∈ N\, we can construct a space isometric to subspaces of Lq for all q∈ Q simultaneously. This paper requires vanilla.sty

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