Add to ORKGWe establish Luzin N and Morse-Sard properties for BV2 functions defined on open domains in the plane. Using these results we prove that almost all level sets are finite disjoint unions of Lipschitz arcs whose tangent vectors are of bounded variation. In the case of W2,1 functions we strengthen the conclusion and show that almost all level sets are finite disjoint unions of C1 arcs whose tangent vectors are absolutely continuous along these arcs. © European Mathematical Society
We prove that the topographic map structure of upper semicon-tinuous functions, defined in terms of ...
AbstractWe show that if the gradient of f:R2→R exists everywhere and is nowhere zero, then in a neig...
summary:In this paper we study Lipschitz-Fredholm vector fields on bounded Fréchet-Finsler manifolds...
We consider certain properties of maps of class C-2 from R-d to Rd-1 that are strictly related to Sa...
In the paper we extend the Morse\u2013Sard Theorem to mappings u belonging to the Sobolev class Wn,n...
Abstract. Consider a co-Lipschitz uniformly continuous function f defined on the plane. Let n(f) be ...
We prove that the topographic map structure of upper semicontinuous functions, defined in terms of c...
The subject of this paper is the bounded level curves of a meromorphic function $f$ with domain $G$ ...
AbstractWe extend the Morse–Sard theorem to mappings u belonging to the Sobolev class Wn,n(Rn,R) wit...
We use an inequality due to Bochnak and Lojasiewicz, which follows from the Curve Selection Lemma of...
The Morse-Sard theorem requires that a mapping v : ℝn → ℝm is of class Ck, k > max(n - m, 0). In 195...
Let Ω be an open subset of R n . Consider a differentiable map u : Ω → R m . For many application in...
Considering regular mappings of Euclidean spaces, we study the distortion of the Hausdorff dimension...
The classical Morse-Sard theorem claims that for a mapping v : R-n -> Rm+1 of class C-k the measu...
We prove Luzin N- and Morse–Sard properties for mappings v:ℝn→ℝd of the Sobolev–Lorentz class Wkp,1 ...
We prove that the topographic map structure of upper semicon-tinuous functions, defined in terms of ...
AbstractWe show that if the gradient of f:R2→R exists everywhere and is nowhere zero, then in a neig...
summary:In this paper we study Lipschitz-Fredholm vector fields on bounded Fréchet-Finsler manifolds...
We consider certain properties of maps of class C-2 from R-d to Rd-1 that are strictly related to Sa...
In the paper we extend the Morse\u2013Sard Theorem to mappings u belonging to the Sobolev class Wn,n...
Abstract. Consider a co-Lipschitz uniformly continuous function f defined on the plane. Let n(f) be ...
We prove that the topographic map structure of upper semicontinuous functions, defined in terms of c...
The subject of this paper is the bounded level curves of a meromorphic function $f$ with domain $G$ ...
AbstractWe extend the Morse–Sard theorem to mappings u belonging to the Sobolev class Wn,n(Rn,R) wit...
We use an inequality due to Bochnak and Lojasiewicz, which follows from the Curve Selection Lemma of...
The Morse-Sard theorem requires that a mapping v : ℝn → ℝm is of class Ck, k > max(n - m, 0). In 195...
Let Ω be an open subset of R n . Consider a differentiable map u : Ω → R m . For many application in...
Considering regular mappings of Euclidean spaces, we study the distortion of the Hausdorff dimension...
The classical Morse-Sard theorem claims that for a mapping v : R-n -> Rm+1 of class C-k the measu...
We prove Luzin N- and Morse–Sard properties for mappings v:ℝn→ℝd of the Sobolev–Lorentz class Wkp,1 ...
We prove that the topographic map structure of upper semicon-tinuous functions, defined in terms of ...
AbstractWe show that if the gradient of f:R2→R exists everywhere and is nowhere zero, then in a neig...
summary:In this paper we study Lipschitz-Fredholm vector fields on bounded Fréchet-Finsler manifolds...