On extending Ck functions from an open set to R, with applications

Abstract

For k∈ \∞\ and U open in , let \,k(U) be the ring of real valued functions on U with the first k derivatives continuous. It is shown for f∈ \,k(U) there is g∈ ∞ with U g and h∈ k with fgU=hU. The function f and its k derivatives are not assumed to be bounded on U. The function g is constructed using splines based on the Mollifier function. Some consequences about the ring k are deduced from this, in particular that (k) = Q(k).

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