tetraeedroid

Tetraeedroid is a class of geometric objects defined by fourfold symmetry tied to a regular tetrahedron. In its most common interpretation, a tetraeedroid is a closed, smooth surface in three-dimensional space whose symmetry group matches that of a regular tetrahedron, denoted Td. The term is used in discussions of geometric modeling, computer graphics, and mathematical visualization to describe surfaces that exhibit tetrahedral symmetry without being strictly a polyhedron with flat faces.

There are several ways to construct a tetraeedroid. One approach is to start with a sphere and

Key properties include its symmetry group, which constrains its curvature and shape, and its topology, which

In practice, tetraeedroids appear in visualization as bead-like or pillow-like approximations of a tetrahedral form, useful