English

On some universal Morse-Sard type Theorem

Analysis of PDEs 2019-06-11 v4

Abstract

The classical Morse--Sard theorem claims that for a mapping v:RnRm+1v:\mathbb R^n\to\mathbb R^{m+1} of class CkC^k the measure of critical values v(Zv,m)v(Z_{v,m}) is zero under condition knmk\ge n-m. Here the critical set, or mm-critical set is defined as Zv,m={xRn:rankv(x)m}Z_{v,m} = \{ x \in \mathbb R^n : \, {\rm rank}\,\nabla v(x)\le m \}. Further Dubovitski\u{\i} in 1957 and independently Federer and Dubovitski\u{\i} in 1967 found some elegant extensions of this theorem to the case of other (e.g., lower) smoothness assumptions. They also established the sharpness of their results within the CkC^k category. Here we formulate and prove a \textit{bridge theorem} that includes all the above results as particular cases: namely, if a function v:RnRdv:\mathbb R^n\to\mathbb R^d belongs to the Holder class Ck,αC^{k,\alpha}, 0α10\le\alpha\le1, then for every q>mq>m the identity Hμ(Zv,mv1(y))=0\mathcal H^{\mu}(Z_{v,m}\cap v^{-1}(y))=0 holds for Hq\mathcal H^q-almost all yRdy\in\mathbb R^d, where μ=nm(k+α)(qm)\mu=n-m-(k+\alpha)(q-m). The result is new even for the classical CkC^k-case (when α=0\alpha=0); a similar result is established for the Sobolev classes of mappings Wpk(Rn,Rd)W^k_p(\mathbb R^n,\mathbb R^d) with minimal integrability assumptions p=max(1,n/k)p=\max(1,n/k), i.e., it guarantees in general only the continuity (not everywhere differentiability) of a mapping. However, using some NN-properties for Sobolev mappings, established in our previous paper, we obtained that the sets of nondifferentiability points of Sobolev mappings are fortunately negligible in the above bridge theorem. We cover also the case of fractional Sobolev spaces. The proofs of the most results are based on our previous joint papers with J. Bourgain and J. Kristensen (2013, 2015).

Cite

@article{arxiv.1706.05266,
  title  = {On some universal Morse-Sard type Theorem},
  author = {Adele Ferone and Mikhail V. Korobkov and Alba Roviello},
  journal= {arXiv preprint arXiv:1706.05266},
  year   = {2019}
}

Comments

arXiv admin note: text overlap with arXiv:1603.05858, arXiv:1706.04796

R2 v1 2026-06-22T20:20:54.737Z