We give an essentially sharp estimate in terms of generalized Hausdorff measures for images of porous sets under monotone Sobolev mappings, satisfying suitable Orlicz-Sobolev conditions
Using probabilistic ideas, we prove that the packing dimension of a mean porous measure is strictly ...
We prove that the packing dimension of any mean porous Radon measure on Rd may be estimated from abo...
We extend the validity of a Gromov’s dimension comparison estimate for topological hypersurfaces to ...
Abstract. We dene the class of weakly mean porous sets and prove a sharp dimension estimate for the ...
AbstractWe investigate how the integrability of the derivatives of Orlicz–Sobolev mappings defined o...
We introduce a notion of mean porosity for measures and obtain dimensional bounds for mean-porous an...
Abstract. We study how planar Sobolev homeomorphisms dis-tort sets of Hausdorff dimension strictly l...
Abstract. We investigate how planar Sobolev-Orlicz homeomorphisms map sets of Hausdorff dimension le...
We prove that the packing dimension of any mean porous Radon measure on $mathbb R^d$ may be estimate...
Abstract. We prove an asymptotically sharp dimension estimate for sets with large porosity in a coll...
Considering regular mappings of Euclidean spaces, we study the distortion of the Hausdorff dimension...
Abstract. A. Salli proved in [14] an asymptotically sharp dimension estimate for sets in Rn with lar...
Abstract. We prove that the packing dimension of any mean porous Radon measure on Rd may be estimate...
We prove that the packing dimension of any mean porous Radon measure on Rd may be estimated from abo...
Abstract. In Rn, we establish an asymptotically sharp upper bound for the upper Minkowski dimension ...
Using probabilistic ideas, we prove that the packing dimension of a mean porous measure is strictly ...
We prove that the packing dimension of any mean porous Radon measure on Rd may be estimated from abo...
We extend the validity of a Gromov’s dimension comparison estimate for topological hypersurfaces to ...
Abstract. We dene the class of weakly mean porous sets and prove a sharp dimension estimate for the ...
AbstractWe investigate how the integrability of the derivatives of Orlicz–Sobolev mappings defined o...
We introduce a notion of mean porosity for measures and obtain dimensional bounds for mean-porous an...
Abstract. We study how planar Sobolev homeomorphisms dis-tort sets of Hausdorff dimension strictly l...
Abstract. We investigate how planar Sobolev-Orlicz homeomorphisms map sets of Hausdorff dimension le...
We prove that the packing dimension of any mean porous Radon measure on $mathbb R^d$ may be estimate...
Abstract. We prove an asymptotically sharp dimension estimate for sets with large porosity in a coll...
Considering regular mappings of Euclidean spaces, we study the distortion of the Hausdorff dimension...
Abstract. A. Salli proved in [14] an asymptotically sharp dimension estimate for sets in Rn with lar...
Abstract. We prove that the packing dimension of any mean porous Radon measure on Rd may be estimate...
We prove that the packing dimension of any mean porous Radon measure on Rd may be estimated from abo...
Abstract. In Rn, we establish an asymptotically sharp upper bound for the upper Minkowski dimension ...
Using probabilistic ideas, we prove that the packing dimension of a mean porous measure is strictly ...
We prove that the packing dimension of any mean porous Radon measure on Rd may be estimated from abo...
We extend the validity of a Gromov’s dimension comparison estimate for topological hypersurfaces to ...
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