Lipschitz extension constants equal projection constants
Abstract
For a Banach space V we define its Lipschitz extension constant, (V), to be the infimum of the constants c such that for every metric space (Z,), every X ⊂ Z, and every f: X V, there is an extension, g, of f to Z such that L(g) cL(f), where L denotes the Lipschitz constant. The basic theorem is that when V is finite-dimensional we have (V) = (V) where (V) is the well-known projection constant of V. We obtain some direct consequences of this theorem, especially when V = Mn(). We then apply techniques for calculating projection constants, involving averaging projections, to calculate ((Mn())sa). We also discuss what happens if we also require that \|g\|∞ = \|f\|∞.
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