Definition:Topological Manifold/Differentiable Manifold

Definition
Let $M$ be a second countable locally Euclidean space.

Let $\mathscr F$ be a differentiable structure on $M$ of class $\mathcal C^k$, where $k \geq 1$.

Then $\left({M, \mathscr F}\right)$ is called a differentiable manifold of class $C^k$.

Also see

 * Smooth Manifold