Add to ORKGThe study of minimal surfaces has a long history, due to the important applications. Given a fixed boundary, one wants to minimise the surface area: this can be used, for example, to minimise the area of the roof of a building. Similarly, looking for constant mean curvature (CMC) provides us with many interesting applications in physics: one of the easiest examples are soap bubbles. In this work however we occupy ourselves with minimal and constant mean curvature surfaces in the three-dimensional sphere $S^3$ and its dual space $\Sigma^3$. In Chapter 1 we give a brief overview of the tools of Riemannian and Lorentzian geometry that we will use. We then take a closer look at $S^3$, computing its Levi-Civita connection and sectional curvatu...
Consider the following question: Does there exist a three-manifold M for which, given any riemannian...
The mean curvature of a surface is an extrinsic parameter measuring how the surface is curved in the...
presented by Manfredo do Carmo We show that the Hopf differentials of a pair of isometric cousin sur...
Abstract. For each integer m ≥ 2 and ` ≥ 1 we construct a pair of compact embedded minimal surfaces...
This dissertation consists of three parts. The first part is an assortment of results about the geom...
Bryant showed that in a space of constant sectional curvature - c2 (for c ∈ R ), there is ...
This work is divided into three sections. In the first, we construct new complete finite total curva...
For Bryant\u27s representation $\Phi\colon \widetilde{M} \rightarrow \SL_2(\C)$ of a constant mean c...
In this paper, we develop some new tools and theory that are useful in describing the geometry of ...
In this thesis we look at minimal surfaces in R^3. We begin by looking at the theory of minimal surf...
In this dissertation, minimal and constant mean curvature surface theory in 3-dimensional Riemannian...
In this thesis, we prove that if $(M,g)$ is a $C^3$-smooth, 3-dimensional Riemannian manifold with m...
Abstract. A general study of minimal surfaces of the Riemannian prod-uct of two spheres S2 × S2 is t...
Inspired by the work of Heller (2013), we show that there exists a DPW potential for the Lawson surf...
The subject of this thesis is the study of minimal and constant mean curvature submanifolds and of t...
Consider the following question: Does there exist a three-manifold M for which, given any riemannian...
The mean curvature of a surface is an extrinsic parameter measuring how the surface is curved in the...
presented by Manfredo do Carmo We show that the Hopf differentials of a pair of isometric cousin sur...
Abstract. For each integer m ≥ 2 and ` ≥ 1 we construct a pair of compact embedded minimal surfaces...
This dissertation consists of three parts. The first part is an assortment of results about the geom...
Bryant showed that in a space of constant sectional curvature - c2 (for c ∈ R ), there is ...
This work is divided into three sections. In the first, we construct new complete finite total curva...
For Bryant\u27s representation $\Phi\colon \widetilde{M} \rightarrow \SL_2(\C)$ of a constant mean c...
In this paper, we develop some new tools and theory that are useful in describing the geometry of ...
In this thesis we look at minimal surfaces in R^3. We begin by looking at the theory of minimal surf...
In this dissertation, minimal and constant mean curvature surface theory in 3-dimensional Riemannian...
In this thesis, we prove that if $(M,g)$ is a $C^3$-smooth, 3-dimensional Riemannian manifold with m...
Abstract. A general study of minimal surfaces of the Riemannian prod-uct of two spheres S2 × S2 is t...
Inspired by the work of Heller (2013), we show that there exists a DPW potential for the Lawson surf...
The subject of this thesis is the study of minimal and constant mean curvature submanifolds and of t...
Consider the following question: Does there exist a three-manifold M for which, given any riemannian...
The mean curvature of a surface is an extrinsic parameter measuring how the surface is curved in the...
presented by Manfredo do Carmo We show that the Hopf differentials of a pair of isometric cousin sur...