On Luzin N-property and uncertainty principle for the Sobolev mappings

Abstract

We study Luzin N-property with respect to the Hausdorff measures for Sobolev spaces Wkp(Rn,Rd). We prove that such N-property holds except for one critical dimensional value t*=n-(k-1)p; for this critical value the N-property fails in general, and we constructed the corresponding nontrivial counterexample (based on the theory of lacunary Fourier series). Nevertheless, this N-property holds if we assume in addition that the highest k-derivatives belongs to the Lorentz space Lp,1 instead of Lp. We extend these results to the case of fractional Sobolev spaces as well. Also, we establish some Fubini type theorems for N-properties and discuss their applications to the Morse--Sard theorem and its recent extensions.