Let K be a compact subset of Cn . The polynomially convex hull of K is defined as The compact set K is said to be polynomially convex if = K. A closed subset is said to be locally polynomially convex at if there exists a closed ball centred at z such that is polynomially convex. The aim of this thesis is to derive easily checkable conditions to detect polynomial convexity in certain classes of sets in This thesis begins with the basic question: Let S1 and S2 be two smooth, totally real surfaces in C2 that contain the origin. If the union of their tangent planes is locally polynomially convex at the origin, then is locally polynomially convex at the origin? If then it is a folk result that the answer is, “Yes.” We discu...
We provide some conditions for the graph of a Holder-continuous function on (D) over bar, where (D) ...
Let $S$ be a smooth, totally real, compact immersion in $\mathbb{C}^n$ of real dimension $m \leq n$,...
AbstractA set K of nodes of a graph G is geodesically convex (respectively, monophonically convex) i...
AbstractWe give sufficient conditions so that the union of a totally real graph M in C2 and its tang...
A compact subset K ⊂ Cn is said to be polynomially convex if for every point ζ / ∈ K, there exists a...
We consider the following question: Let S (1) and S (2) be two smooth, totally-real surfaces in C-2 ...
We prove that three pairwise disjoint, convex sets can be found, all congruent to a set of the form ...
The goal of this dissertation is to prove two results which are essentially independent, but which d...
AbstractWe begin with the following question: given a closed disc D¯⋐C and a complex-valued function...
We begin with the following question: given a closed disc (D) over bar subset of C and a complex-val...
Abstract. For a non-empty compact set A ⊂ Rd, d ≥ 2, and r ≥ 0, let A⊕r denote the set of points who...
Abstract. We begin with the following question: given a closed disc D b C and a complex-valued funct...
AbstractWe prove a version of the Hilbert Lemniscate Theorem in Cn. More precisely, any polynomially...
AbstractWe prove the following criterion: a compact connected piecewise-linear hypersurface (without...
The polynomial convexity of subsets of the complex two torus is considered. By investigating the rel...
We provide some conditions for the graph of a Holder-continuous function on (D) over bar, where (D) ...
Let $S$ be a smooth, totally real, compact immersion in $\mathbb{C}^n$ of real dimension $m \leq n$,...
AbstractA set K of nodes of a graph G is geodesically convex (respectively, monophonically convex) i...
AbstractWe give sufficient conditions so that the union of a totally real graph M in C2 and its tang...
A compact subset K ⊂ Cn is said to be polynomially convex if for every point ζ / ∈ K, there exists a...
We consider the following question: Let S (1) and S (2) be two smooth, totally-real surfaces in C-2 ...
We prove that three pairwise disjoint, convex sets can be found, all congruent to a set of the form ...
The goal of this dissertation is to prove two results which are essentially independent, but which d...
AbstractWe begin with the following question: given a closed disc D¯⋐C and a complex-valued function...
We begin with the following question: given a closed disc (D) over bar subset of C and a complex-val...
Abstract. For a non-empty compact set A ⊂ Rd, d ≥ 2, and r ≥ 0, let A⊕r denote the set of points who...
Abstract. We begin with the following question: given a closed disc D b C and a complex-valued funct...
AbstractWe prove a version of the Hilbert Lemniscate Theorem in Cn. More precisely, any polynomially...
AbstractWe prove the following criterion: a compact connected piecewise-linear hypersurface (without...
The polynomial convexity of subsets of the complex two torus is considered. By investigating the rel...
We provide some conditions for the graph of a Holder-continuous function on (D) over bar, where (D) ...
Let $S$ be a smooth, totally real, compact immersion in $\mathbb{C}^n$ of real dimension $m \leq n$,...
AbstractA set K of nodes of a graph G is geodesically convex (respectively, monophonically convex) i...