Research output: Contribution to journal › Article › peer-review
A bridge between Dubovitskiĭ–Federer theorems and the coarea formula. / Hajłasz, Piotr; Korobkov, Mikhail V.; Kristensen, Jan.
In: Journal of Functional Analysis, Vol. 272, No. 3, 01.02.2017, p. 1265-1295.Research output: Contribution to journal › Article › peer-review
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TY - JOUR
T1 - A bridge between Dubovitskiĭ–Federer theorems and the coarea formula
AU - Hajłasz, Piotr
AU - Korobkov, Mikhail V.
AU - Kristensen, Jan
N1 - Publisher Copyright: © 2016 Elsevier Inc.
PY - 2017/2/1
Y1 - 2017/2/1
N2 - The Morse–Sard theorem requires that a mapping v:Rn→Rm is of class Ck, k>max(n−m,0). In 1957 Dubovitskiĭ generalized this result by proving that almost all level sets for a Ck mapping have Hs-negligible intersection with its critical set, where s=max(n−m−k+1,0). Here the critical set, or m-critical set is defined as Zv,m={x∈Rn:rank∇v(x)k mappings v:Rn→Rd and integers m≤d they proved that the set of m-critical values v(Zv,m) is Hq∘ -negligible for q∘=m−1+. They also established the sharpness of these results within the Ck category. Here we prove that Dubovitskiĭ's theorem can be generalized to the case of continuous mappings of the Sobolev–Lorentz class Wp,1 k(Rn,Rd), p=n/k (this is the minimal integrability assumption that guarantees the continuity of mappings). In this situation the mappings need not to be everywhere differentiable and in order to handle the set of nondifferentiability points, we establish for such mappings an analog of the Luzin N-property with respect to lower dimensional Hausdorff content. Finally, we formulate and prove a bridge theorem that includes all the above results as particular cases. As a limiting case in this bridge theorem we also establish a new coarea type formula: if E⊂{x∈Rn:rank∇v(x)≤m}, then ∫EJmv(x)dx=∫RdHn−m(E∩v−1(y))dHm(y). The mapping v is Rd-valued, with arbitrary d, and the formula is obtained without any restrictions on the image v(Rn) (such as m-rectifiability or σ-finiteness with respect to the m-Hausdorff measure). These last results are new also for smooth mappings, but are presented here in the general Sobolev context. The proofs of the results are based on our previous joint papers with J. Bourgain (2013, 2015).
AB - The Morse–Sard theorem requires that a mapping v:Rn→Rm is of class Ck, k>max(n−m,0). In 1957 Dubovitskiĭ generalized this result by proving that almost all level sets for a Ck mapping have Hs-negligible intersection with its critical set, where s=max(n−m−k+1,0). Here the critical set, or m-critical set is defined as Zv,m={x∈Rn:rank∇v(x)k mappings v:Rn→Rd and integers m≤d they proved that the set of m-critical values v(Zv,m) is Hq∘ -negligible for q∘=m−1+. They also established the sharpness of these results within the Ck category. Here we prove that Dubovitskiĭ's theorem can be generalized to the case of continuous mappings of the Sobolev–Lorentz class Wp,1 k(Rn,Rd), p=n/k (this is the minimal integrability assumption that guarantees the continuity of mappings). In this situation the mappings need not to be everywhere differentiable and in order to handle the set of nondifferentiability points, we establish for such mappings an analog of the Luzin N-property with respect to lower dimensional Hausdorff content. Finally, we formulate and prove a bridge theorem that includes all the above results as particular cases. As a limiting case in this bridge theorem we also establish a new coarea type formula: if E⊂{x∈Rn:rank∇v(x)≤m}, then ∫EJmv(x)dx=∫RdHn−m(E∩v−1(y))dHm(y). The mapping v is Rd-valued, with arbitrary d, and the formula is obtained without any restrictions on the image v(Rn) (such as m-rectifiability or σ-finiteness with respect to the m-Hausdorff measure). These last results are new also for smooth mappings, but are presented here in the general Sobolev context. The proofs of the results are based on our previous joint papers with J. Bourgain (2013, 2015).
KW - Coarea formula
KW - Luzin N-property
KW - Morse–Sard theorem
KW - Sobolev–Lorentz mappings
KW - Sobolev-Lorentz mappings
KW - SPACES
KW - PROPERTY
KW - Lnyin N-property
KW - MORSE-SARD THEOREM
KW - SOBOLEV FUNCTIONS
KW - RECTIFIABLE SETS
KW - MAPPINGS
KW - Morse-Sard theorem
UR - http://www.scopus.com/inward/record.url?scp=85005982581&partnerID=8YFLogxK
U2 - 10.1016/j.jfa.2016.10.031
DO - 10.1016/j.jfa.2016.10.031
M3 - Article
AN - SCOPUS:85005982581
VL - 272
SP - 1265
EP - 1295
JO - Journal of Functional Analysis
JF - Journal of Functional Analysis
SN - 0022-1236
IS - 3
ER -
ID: 9067912