AbstractInspired by the Weierstrass representation of smooth affine minimal surfaces with indefinite metric, we propose a constructive process producing a large class of discrete surfaces that we call discrete affine minimal surfaces. We show that they are critical points of an affine area functional defined on the space of quadrangular discrete surfaces. The construction makes use of asymptotic coordinates and allows defining the discrete analogs of some differential geometric objects, such as the normal and co-normal vector fields, the cubic form and the compatibility equations
We prove optimal convergence results for discrete approximations to (possibly unstable) minimal surf...
Minimal Surfaces are surfaces which locally minimize area. These surfaces are well-known as mathemat...
We solve the problem of finding and justifying an optimal fully discrete finite element procedure fo...
AbstractInspired by the Weierstrass representation of smooth affine minimal surfaces with indefinite...
summary:In this paper we discuss planar quadrilateral (PQ) nets as discrete models for convex affine...
AbstractMotivated by applications in freeform architecture, we study surfaces which are composed of ...
We present a new algorithm to compute stable discrete minimal surfaces bounded by a number of fixed ...
We propose a natural discretisation scheme for classical projective minimal surfaces. We follow the ...
The study of minimal surfaces is related to different areas of science like Mathematics, Physics, Ch...
Discrete Weierstrass-type representations yield a construction method in discrete differential geome...
We introduce Möbius invariant objects - discrete holomorphic quadratic differentials to connect disc...
In this thesis we present an elementary introduction to the Discrete differen- tial geometry. We wil...
A triangulated piecewise-linear minimal surface in Euclidean 3space defined using a variational...
In this chapter, we give a brief account of the notion of discrete varifolds, which are general an...
In this paper, we are exploring how to construct a discrete minimal surface. We map the conformal cu...
We prove optimal convergence results for discrete approximations to (possibly unstable) minimal surf...
Minimal Surfaces are surfaces which locally minimize area. These surfaces are well-known as mathemat...
We solve the problem of finding and justifying an optimal fully discrete finite element procedure fo...
AbstractInspired by the Weierstrass representation of smooth affine minimal surfaces with indefinite...
summary:In this paper we discuss planar quadrilateral (PQ) nets as discrete models for convex affine...
AbstractMotivated by applications in freeform architecture, we study surfaces which are composed of ...
We present a new algorithm to compute stable discrete minimal surfaces bounded by a number of fixed ...
We propose a natural discretisation scheme for classical projective minimal surfaces. We follow the ...
The study of minimal surfaces is related to different areas of science like Mathematics, Physics, Ch...
Discrete Weierstrass-type representations yield a construction method in discrete differential geome...
We introduce Möbius invariant objects - discrete holomorphic quadratic differentials to connect disc...
In this thesis we present an elementary introduction to the Discrete differen- tial geometry. We wil...
A triangulated piecewise-linear minimal surface in Euclidean 3space defined using a variational...
In this chapter, we give a brief account of the notion of discrete varifolds, which are general an...
In this paper, we are exploring how to construct a discrete minimal surface. We map the conformal cu...
We prove optimal convergence results for discrete approximations to (possibly unstable) minimal surf...
Minimal Surfaces are surfaces which locally minimize area. These surfaces are well-known as mathemat...
We solve the problem of finding and justifying an optimal fully discrete finite element procedure fo...