$C^n$

Let $f:ℝ\to ℝ$ be a function. We say that $f$ is of class $C^1$ if $f^{\prime }$ exists and is continuous.

We also say that $f$ is of class $C^n$ if its $n$-th derivative exists and is continuous (and therefore all other previous derivatives exist and are continuous too).

The class of continuous functions is denoted by $C^0$. So we get the following relationship among these classes:

$$C^0\supset C^1\supset C^2\supset C^3\supset \mathrm{\dots }$$

Finally, the class of functions that have continuous derivatives of any order is denoted by $C^{\mathrm{\infty }}$ and thus

$$C^{\mathrm{\infty }}=\bigcap _{n=0}^{\mathrm{\infty }}{C}^n.$$

It holds that any function that is differentiable is also continuous (see this entry (http://planetmath.org/DifferentiableFunctionsAreContinuous)). Therefore, $f\in C^{\mathrm{\infty }}$ if and only if every derivative of $f$ exists.

The previous concepts can be extended to functions $f:{ℝ}^m\to ℝ$, where $f$ being of class $C^n$ amounts to asking that all the partial derivatives of order $n$ be continuous. For instance, $f:{ℝ}^m\to ℝ$ being $C^2$ means that

$$\frac{{\partial }^{2}f}{\partial x_j\partial x_i}$$

exists and are all continuous for any $i,j$ from $1$ to $m$.