AbstractFor each purely n−1 unrectifiable compact set C⊂Rn such that 0<Hn−1(C)<∞, there is a bounded Borel measurable vectorfield v:Rn→Rn whose flux vanishes in Rn∼C but not in Rn
Let $f: M \to M$ be a $C^{1+\alpha}$ map/diffeomorphism of a compact Riemannian manifold $M$ and $\m...
This thesis gives a more detailed version of a proof from Daniel Mauldin that the set of continuous ...
Suppose that A is a uniform algebra on a compact set X and that ϕ: A → C is a nonzero multiplicative...
For each purely n - 1 unrectifiable compact set C subset of Rn such that 0 R-n whose flux vanishes ...
AbstractFor each purely n−1 unrectifiable compact set C⊂Rn such that 0<Hn−1(C)<∞, there is a bounded...
We show that any closed set E having a sigma-finite (n - 1)-dimensional Hausdorff measure does not s...
Let b: [0, T] × ℝd → ℝd be a bounded Borel vector field, T > 0 and let µ be a non-negative Radon ...
A bstract. Let X be a bounded vector field with bounded divergence defined in an open set Ω of Rd, t...
A compact subset S of R^N is removable for the equation div v = 0 if every bounded Borel vector fiel...
We prove that every closed set which is not (sigma)-finite with respect to the Hausdorff measure (cH...
Assume M is a 3-dimensional real manifold without boundary, A is an abelian Lie algebra of analytic ...
summary:For $ z\in \partial B^n$, the boundary of the unit ball in $\mathbb{C}^n$, let $\Lambda (z)=...
Let f = I - k be a compact vector field of class C1 on a real Hilbert space H. In the spirit of Bolz...
1. Let E be a closed set in the complex plane and / a function mermorphic outside.E omitting a set F...
The Hausdorff dimension is obtained for exceptional sets associated with linearising a complex analy...
Let $f: M \to M$ be a $C^{1+\alpha}$ map/diffeomorphism of a compact Riemannian manifold $M$ and $\m...
This thesis gives a more detailed version of a proof from Daniel Mauldin that the set of continuous ...
Suppose that A is a uniform algebra on a compact set X and that ϕ: A → C is a nonzero multiplicative...
For each purely n - 1 unrectifiable compact set C subset of Rn such that 0 R-n whose flux vanishes ...
AbstractFor each purely n−1 unrectifiable compact set C⊂Rn such that 0<Hn−1(C)<∞, there is a bounded...
We show that any closed set E having a sigma-finite (n - 1)-dimensional Hausdorff measure does not s...
Let b: [0, T] × ℝd → ℝd be a bounded Borel vector field, T > 0 and let µ be a non-negative Radon ...
A bstract. Let X be a bounded vector field with bounded divergence defined in an open set Ω of Rd, t...
A compact subset S of R^N is removable for the equation div v = 0 if every bounded Borel vector fiel...
We prove that every closed set which is not (sigma)-finite with respect to the Hausdorff measure (cH...
Assume M is a 3-dimensional real manifold without boundary, A is an abelian Lie algebra of analytic ...
summary:For $ z\in \partial B^n$, the boundary of the unit ball in $\mathbb{C}^n$, let $\Lambda (z)=...
Let f = I - k be a compact vector field of class C1 on a real Hilbert space H. In the spirit of Bolz...
1. Let E be a closed set in the complex plane and / a function mermorphic outside.E omitting a set F...
The Hausdorff dimension is obtained for exceptional sets associated with linearising a complex analy...
Let $f: M \to M$ be a $C^{1+\alpha}$ map/diffeomorphism of a compact Riemannian manifold $M$ and $\m...
This thesis gives a more detailed version of a proof from Daniel Mauldin that the set of continuous ...
Suppose that A is a uniform algebra on a compact set X and that ϕ: A → C is a nonzero multiplicative...
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