The norm of linear extension operators for Cm-1,1(Rn)

Abstract

Fix integers m 2, n 1. We prove the existence of a bounded linear extension operator for Cm-1,1(n) with operator norm at most (γ Dk), where D := m+n-1n is the number of multiindices of length n and order at most m-1, and γ,k > 0 are absolute constants (independent of m,n,E). Upper bounds on the norm of this operator are relevant to basic questions about fitting a smooth function to data. Our results improve on a previous construction of extension operators of norm at most (γ Dk 2D). Along the way, we establish a finiteness theorem for Cm-1,1(n) with improved bounds on the involved constants.