Another proof of a Gowers theorem
Abstract
W. T. Gowers proved that every Lipschitz function from the unit sphere of the Banach space c0 to R is oscilation stable. His proof uses a result about finite partitions of the set FINk of finitely supported functions p from N to \0,1,...,k\ with k in Im(p). Every known proof of this fact uses methods of topological dynamics on the space βN of ultrafilters on N. We give a purely combinatorial proof of this result avoiding the use of ultrafilters.
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