A minimal surface is the surface of smallest area of all the surfaces bounded by a closed curve in space. Its mean curvature is zero. Minimal surfaces greatly interested a few nineteenth century ...

Minimal surfaces, defined informally as surfaces that locally minimise area, have long captivated both mathematicians and physicists due to their elegant geometric properties and rich analytical ...

Geometric measure theory provides a rigorous framework for studying and quantifying the properties of sets and surfaces in Euclidean spaces. This discipline blends techniques from differential ...

IIIF provides researchers rich metadata and media viewing options for comparison of works across cultural heritage collections. Visit the IIIF page to learn more. Students at the technical high school ...

We continue explorations of minimal surfaces and their tie-in with various constructive and fabrication technologies to understand how complex 3-dimensional forms can be modeled and built using ...

Considering soft computing, the Weierstrass data (ζ−1/2, ζ1/2) gives two different minimal surface equations and figures. By using hard computing, we give the family of minimal and spacelike maximal ...