Costa's minimal surface is a notable example of a non-embedded minimal surface in three-dimensional space, discovered by the mathematician Hugo Ferreira Costa in 1982. It provides an important counterexample to the general intuition about minimal surfaces, particularly because it exhibits a complex topology. Here are some key features of Costa's minimal surface: 1. **Topological Structure**: Costa's surface is homeomorphic to a torus (it has the same basic shape as a donut).
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