Construction of a class of minimal surfaces with ESL

The fascinating characters of minimal surface make it to be widely used in shape design. While the flexibility and high quality of subdivision surface make it a powerful mathematical tool for shape representation. In this paper, we construct minimal subdivision surfaces with given boundaries using t

The thickness of a graph G is the minimum number of planar subgraphs whose union is G. A t-minimal graph is a graph of thickness t which contains no proper subgraph of thickness t. For each t ~> 2 we present an explicit construction of an infinite number of t-minimal graphs with connectivity 2, edge

Steiner minimal tree for a given set of points in the plane is a tree which interconnects these points using Eines of shortest possible total length. We construct an infinite class of trees which are the unique full Steiner minimal trees for their sets of endpoints (vertices of degree one).