arXiv:math/9804023 Abstract

arXiv:math/9804023 [math.MG]Abstract References Reviews Resources

Another low-technology estimate in convex geometry

Published 1998-04-06Version 1

We give a short argument that for some C > 0, every n-dimensional Banach ball K admits a 256-round subquotient of dimension at least C n/(log n). This is a weak version of Milman's quotient of subspace theorem, which lacks the logarithmic factor.

Comments: 11 pages

Journal: Math. Sci. Res. Inst. Publ. 34 (1999), 117-121

Categories: math.MG

Keywords: convex geometry, low-technology estimate, n-dimensional banach ball, short argument, weak version

Tags: journal article

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arXiv:math/9804023 [math.MG]Abstract References Reviews Resources

Another low-technology estimate in convex geometry

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Another low-technology estimate in convex geometry

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arXiv:math/9804023 [math.MG]Abstract References Reviews Resources