A counterexample to a strengthening of a question of Milman

Abstract

Let |·| be the standard Euclidean norm on Rn and let X=(Rn,\|·\|) be a normed space. A subspace Y⊂ X is strongly α-Euclidean if there is a constant t such that t|y|≤\|y\|≤α t|y| for every y∈ Y, and say that it is strongly α-complemented if \|PY\|≤α, where PY is the orthogonal projection from X to Y and \|PY\| denotes the operator norm of PY with respect to the norm on X. We give an example of a normed space X of arbitrarily high dimension that is strongly 2-Euclidean but contains no 2-dimensional subspace that is both strongly (1+ε)-Euclidean and strongly (1+ε)-complemented, where ε>0 is an absolute constant. This example is closely related to an old question of Vitali Milman.

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