= Smooth structure
{wiki=Smooth_structure}
In differential topology, a **smooth structure** on a topological manifold is an essential concept that allows us to define the notion of differentiability for the functions and maps defined on that manifold. \#\#\# Key Concepts: 1. **Manifold**: A manifold is a topological space that locally resembles Euclidean space. More formally, it is a space that can be covered by open sets that are homeomorphic to \\(\\mathbb\{R\}^n\\) for some \\(n\\).
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