AbstractWe begin with the following question: given a closed disc D¯⋐C and a complex-valued function F∈C(D¯), is the uniform algebra on D¯ generated by z and F equal to C(D¯)? When F∈C1(D), this question is complicated by the presence of points in the surface S:=graphD¯(F) that have complex tangents. Such points are called CR singularities. Let p∈S be a CR singularity at which the order of contact of the tangent plane with S is greater than 2; i.e. a degenerate CR singularity. We provide sufficient conditions for S to be locally polynomially convex at the degenerate singularity p. This is useful because it is essential to know whether S is locally polynomially convex at a CR singularity in order to answer the initial question. To this end, ...
AbstractFor a large class of functions G, defined in a neighborhood of the origin in the complex pla...
Abstract. We show that the topological disc (De Paepe’s) P = {(z2, z¯2 +z¯3): |z| ≤ 1} ⊂ C2 has ...
AbstractWe prove a version of the Hilbert Lemniscate Theorem in Cn. More precisely, any polynomially...
AbstractWe begin with the following question: given a closed disc D¯⋐C and a complex-valued function...
Abstract. We begin with the following question: given a closed disc D b C and a complex-valued funct...
We begin with the following question: given a closed disc (D) over bar subset of C and a complex-val...
A compact subset K ⊂ Cn is said to be polynomially convex if for every point ζ / ∈ K, there exists a...
Let K be a compact subset of Cn . The polynomially convex hull of K is defined as The compact se...
Let be a smooth real surface in and let be a point at which the tangent plane is a complex line. How...
We provide some conditions for the graph of a Holder-continuous function on (D) over bar, where (D) ...
AbstractIt is shown that on closed disks D around the origin in the complex plane and for every inte...
The goal of this dissertation is to prove two results which are essentially independent, but which d...
We begin by recalling some basic facts about continuity and differentiability in the one real variab...
AbstractWe give sufficient conditions so that the union of a totally real graph M in C2 and its tang...
AbstractThis work is a continuation of [7]. In that paper, a sufficient condition was given on a rea...
AbstractFor a large class of functions G, defined in a neighborhood of the origin in the complex pla...
Abstract. We show that the topological disc (De Paepe’s) P = {(z2, z¯2 +z¯3): |z| ≤ 1} ⊂ C2 has ...
AbstractWe prove a version of the Hilbert Lemniscate Theorem in Cn. More precisely, any polynomially...
AbstractWe begin with the following question: given a closed disc D¯⋐C and a complex-valued function...
Abstract. We begin with the following question: given a closed disc D b C and a complex-valued funct...
We begin with the following question: given a closed disc (D) over bar subset of C and a complex-val...
A compact subset K ⊂ Cn is said to be polynomially convex if for every point ζ / ∈ K, there exists a...
Let K be a compact subset of Cn . The polynomially convex hull of K is defined as The compact se...
Let be a smooth real surface in and let be a point at which the tangent plane is a complex line. How...
We provide some conditions for the graph of a Holder-continuous function on (D) over bar, where (D) ...
AbstractIt is shown that on closed disks D around the origin in the complex plane and for every inte...
The goal of this dissertation is to prove two results which are essentially independent, but which d...
We begin by recalling some basic facts about continuity and differentiability in the one real variab...
AbstractWe give sufficient conditions so that the union of a totally real graph M in C2 and its tang...
AbstractThis work is a continuation of [7]. In that paper, a sufficient condition was given on a rea...
AbstractFor a large class of functions G, defined in a neighborhood of the origin in the complex pla...
Abstract. We show that the topological disc (De Paepe’s) P = {(z2, z¯2 +z¯3): |z| ≤ 1} ⊂ C2 has ...
AbstractWe prove a version of the Hilbert Lemniscate Theorem in Cn. More precisely, any polynomially...