On Lipschitz extension from finite subsets

Abstract

We prove that for every n∈ N there exists a metric space (X,dX), an n-point subset S⊂eq X, a Banach space (Z,\|·\|Z) and a 1-Lipschitz function f:S Z such that the Lipschitz constant of every function F:X Z that extends f is at least a constant multiple of n. This improves a bound of Johnson and Lindenstrauss. We also obtain the following quantitative counterpart to a classical extension theorem of Minty. For every α∈ (1/2,1] and n∈ N there exists a metric space (X,dX), an n-point subset S⊂eq X and a function f:S 2 that is α-H\"older with constant 1, yet the α-H\"older constant of any F:X 2 that extends f satisfies \|F\|Lip(α) ( n)2α-14α+( n n)α2-12. We formulate a conjecture whose positive solution would strengthen Ball's nonlinear Maurey extension theorem, serving as a far-reaching nonlinear version of a theorem of K\"onig, Retherford and Tomczak-Jaegermann. We explain how this conjecture would imply as special cases answers to longstanding open questions of Johnson and Lindenstrauss and Kalton.