A different proof is given to the result announced in [MS2]: For each 1 ≤ k < n we give an upper bound on the minimal distance of a k-dimensional subspace of an arbitrary n-dimensional normed space to the Hilbert space of dimension k. The result is best possible up to a multiplicative universal constant. Our main result is the following extension of Dvoretzky’s theorem (from the range 1 < k < c log n to c log n ≤ k < n), first announced in [MS2, Theorem 2]. As is remarked in that paper, except for the absolute constant involved the result is best possible. Theorem. There exists a K > 0 such that , for every n and every log n ≤ k < n, any n-dimensional normed space, X, contains a k-dimensional subspace, Y , satisfying d(Y, `2) ≤ K √ k log(1 + n/k) . In particular , if log n ≤ k ≤ n1−Kε2 , there exists a k-dimensional subspace Y (of an arbitrary n-dimensional normed space X) with d(Y, `2) ≤ K ε √ k log n . Jesus Bastero pointed out to us that the proof of the theorem in [MS2] works only in the range k ≤ cn/ log n. Here we give a different proof which corrects this oversight. The main addition is a computation due to E. Gluskin (see the proof of the Theorem in [Gl1] and the remark following the proof of Theorem 2 in [Gl2]). In the next lemma we single out what we need from Gluskin’s argument and sketch Gluskin’s proof. Partially supported by BSF and NSF. Part of this research was carried on at MSRI..
[1]
G. Schechtman,et al.
A CONCENTRATION INEQUALITY FOR HARMONIC MEASURES ON THE SPHERE
,
1995
.
[2]
V. Milman,et al.
Asymptotic Theory Of Finite Dimensional Normed Spaces
,
1986
.
[3]
Nicole Tomczak-Jaegermann,et al.
Projections onto Hilbertian subspaces of Banach spaces
,
1979
.
[4]
G. Pisier.
ASYMPTOTIC THEORY OF FINITE DIMENSIONAL NORMED SPACES (Lecture Notes in Mathematics 1200)
,
1987
.
[5]
G. Pisier.
The volume of convex bodies and Banach space geometry
,
1989
.
[6]
D. Burkholder.
Review: Gilles Pisier, The volume of convex bodies and Banach space geometry
,
1991
.
[7]
T. Figiel,et al.
The dimension of almost spherical sections of convex bodies
,
1976
.
[8]
Jean Bourgain,et al.
The Banach-Mazur distance to the cube and the Dvoretzky-Rogers factorization
,
1988
.
[9]
Gideon Schechtman,et al.
An 'isomorphic' version of Dvoretzky's theorem
,
1995
.
[10]
E. Gluskin.
EXTREMAL PROPERTIES OF ORTHOGONAL PARALLELEPIPEDS AND THEIR APPLICATIONS TO THE GEOMETRY OF BANACH SPACES
,
1989
.
[11]
E. D. Gluskin.
The octahedron is badly approximated by random subspaces
,
1986
.