A smooth structure on a manifold ${\displaystyle M}$  is a collection of smoothly equivalent smooth atlases. Here, a smooth atlas for a topological manifold ${\displaystyle M}$  is an atlas for ${\displaystyle M}$  such that each transition function is a smooth map, and two smooth atlases for ${\displaystyle M}$  are smoothly equivalent provided their union is again a smooth atlas for ${\displaystyle M.}$  This gives a natural equivalence relation on the set of smooth atlases.

A smooth manifold is a topological manifold ${\displaystyle M}$  together with a smooth structure on ${\displaystyle M.}$ 

Maximal smooth atlases

By taking the union of all atlases belonging to a smooth structure, we obtain a maximal smooth atlas. This atlas contains every chart that is compatible with the smooth structure. There is a natural one-to-one correspondence between smooth structures and maximal smooth atlases. Thus, we may regard a smooth structure as a maximal smooth atlas and vice versa.

In general, computations with the maximal atlas of a manifold are rather unwieldy. For most applications, it suffices to choose a smaller atlas. For example, if the manifold is compact, then one can find an atlas with only finitely many charts.

Equivalence of smooth structures

Let ${\displaystyle \mu }$  and ${\displaystyle \nu }$  be two maximal atlases on ${\displaystyle M.}$  The two smooth structures associated to ${\displaystyle \mu }$  and ${\displaystyle \nu }$  are said to be equivalent if there is a diffeomorphism ${\displaystyle f:M\to M}$  such that ${\displaystyle \mu \circ f=\nu .}$ ^{[citation needed]}

John Milnor showed in 1956 that the 7-dimensional sphere admits a smooth structure that is not equivalent to the standard smooth structure. A sphere equipped with a nonstandard smooth structure is called an exotic sphere.

The E8 manifold is an example of a topological manifold that does not admit a smooth structure. This essentially demonstrates that Rokhlin's theorem holds only for smooth structures, and not topological manifolds in general.

The smoothness requirements on the transition functions can be weakened, so that we only require the transition maps to be ${\displaystyle k}$ -times continuously differentiable; or strengthened, so that we require the transition maps to be real-analytic. Accordingly, this gives a ${\displaystyle C^{k}}$  or (real-)analytic structure on the manifold rather than a smooth one. Similarly, we can define a complex structure by requiring the transition maps to be holomorphic.

• Smooth frame
• Atlas (topology) – Set of charts that describes a manifold