Anna Doležalová, Marika Hrubešová, Tomáš Roskovec
Published 2020-05-13Version 1
It is well-known that there is a Sobolev homeomorphism $f\in W^{1,p}([-1,1]^n,[-1,1]^n)$ for any $p<n$ which maps a set $C$ of zero Lebesgue $n$-dimensional measure onto the set of positive measure. We study the size of this critical set $C$ and characterize its lower and upper bounds from the perspective of Hausdorff measures defined by a general gauge function.
On Hausdorff measure and an inequality due to Maz'ya
The topology of critical sets of some ordinary differential operators
An Arzelà-Ascoli theorem for the Hausdorff measure of noncompactness
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