On Boman's Theorem On Partial Regularity Of Mappings

Abstract

Let ⊂Rn×Rm and k be a positive integer. Let f:Rn→Rm be a locally bounded map such that for each (,η)∈, the derivatives Djf(x):=|((dj)/(dtj))f(x+t)|t=0, j=1,2,...k, exist and are continuous. In order to conclude that any such map f is necessarily of class Ck it is necessary and sufficient that be not contained in the zero-set of a nonzero homogenous polynomial (,η) which is linear in η=(η1,η2,...,ηm) and homogeneous of degree k in =(1,2,...,n). This generalizes a result of J. Boman for the case k=1. The statement and the proof of a theorem of Boman for the case k=∞ is also extended to include the Carleman classes CMk and the Beurling classes C(Mk).