Common subspaces of $L_{p}$-spaces

Details Common subspaces of $L_{p}$-spaces Common subspaces of $L_{p}$-spaces

1992-11-05

arxiv.org/abs/math/9211209v1

Mathematics

Functional Analysis

Scientific paper

For $n\geq 2, p<2$ and $q>2,$ does there exist an $n$-dimensional Banach space different from Hilbert spaces which is isometric to subspaces of both $L_{p}$ and $L_{q}$? 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 $(0,\infty)\setminus \{2k, k\in N\},$ we can construct a space isometric to subspaces of $L_{q}$ for all $q\in Q$ simultaneously. This paper requires vanilla.sty

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