higher derivatives of functions with given critical points and values

Abstract

Let f: Bn → R be a d+1 times continuously differentiable function on the unit ball Bn, with z∈ Bn \|f(z)\|=1. A well-known fact is that if f vanishes on a set Z⊂ Bn with a non-empty interior, then for each k=1,…,d+1 the norm of the k-th derivative \|f(k)\| is at least M=M(n,k)>0. A natural question to ask is ``what happens for other sets Z?''. This question was partially answered in [16]-[18]. In the present paper we ask for a similar (and closely related) question: what happens with the high-order derivatives of f, if its gradient vanishes on a given set ? And what conclusions for the high-order derivatives of f can be obtained from the analysis of the metric geometry of the ``critical values set'' f()? In the present paper we provide some initial answers to these questions.