Heat flow and quantitative differentiation
Abstract
For every Banach space (Y,\|·\|Y) that admits an equivalent uniformly convex norm we prove that there exists c=c(Y)∈ (0,∞) with the following property. Suppose that n∈ N and that X is an n-dimensional normed space with unit ball BX. Then for every 1-Lipschitz function f:BX Y and for every ∈ (0,1/2] there exists a radius r(-1/cn), a point x∈ BX with x+rBX⊂ BX, and an affine mapping :X Y such that \|f(y)-(y)\|Y r for every y∈ x+rBX.
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