Taylor series

Definition

About a general point

Suppose $f$ is a function that is infinitely differentiable at a point $x_{0}$ in its domain. The Taylor series of $f$ about $x_{0}$ is the power series given as follows:

$\sum_{k = 0}^{\infty} \frac{f^{(k)} (x_{0})}{k!} (x - x_{0})^{k}$

Here's a version with the first few terms written explicitly:

$f (x_{0}) + f^{'} (x_{0}) (x - x_{0}) + \frac{f^{″} (x_{0})}{2} (x - x_{0})^{2} + \frac{f^{‴} (x_{0})}{6} (x - x_{0})^{3} + \dots$

About the point 0

In the special case of the above definition where $x_{0} = 0$ (and in particular $f$ is infinitely differentiable at 0), the Taylor series is as follows:

$\sum_{k = 0}^{\infty} \frac{f^{(k)} (0)}{k!} x^{k}$

Here's a version with the first few terms written explicitly:

$f (0) + f^{'} (0) x + \frac{f^{″} (0)}{2} x^{2} + \frac{f^{‴} (0)}{6} x^{3} + \dots +$

Well defined on germs of a functions

The Taylor series operator about a point $x_{0}$ can be thought of as a mapping:

(Germs of $C^{\infty}$ -functions defined about $x_{0}$ ) $\to$ (Formal power series centered at $x_{0}$ )

In fact, this mapping is a $R$ -algebra homomorphism that commutes with the differential structure.

Here, two functions $f$ and $g$ are said to have the same germ about a point $x_{0}$ if there is an open interval $U$ containing $x_{0}$ such that $f (x) = g (x) \forall x \in U < / m a h > . = = F a c t s = = T o g e t h e r, t h e s e t h r e e f a c t s s h o w t h a t t h e T a y l o r s e r i e s o p e r a t o r i s a h o m o m o r p h i s m o f < m a t h > R$ -algebras that commutes with the differential structure: