Tangent space

Types of tangent space

Name	Symbol	Definition
Geometric Tangent Space	$G_p(\mathbb{R}^n)$ ^[1]	The set of tangents to a point in $\mathbb{R}^n$ - the set of all arrows at $p$
Tangent space (to $\mathbb{R}^n$ )	$T_p(\mathbb{R}^n)$	The set of all derivations at $p$ ]] $\omega\in T_p(\mathbb{R}^n)\iff \omega:C^\infty(\mathbb{R}^n)\rightarrow\mathbb{R}$ is a derivation
( $T_p(M)$ here)
Tangent space (in terms of germs)	$\mathcal{D}_p(M)$	The set of all derivations of $C^\infty_p(M)$ - the set of all germs of smooth functions at a point, that is: $\omega\in \mathcal{D}_p(M)\iff\omega:C^\infty_p(M)\rightarrow\mathbb{R}$ is a derivation

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I prefer to denote the tangent space (of a set $A$ at a point $p$ ) by $T_p(A)$ - as this involves the letter T for tangent however one author^[2] uses $T_p(A)$ as Set of all derivations at a point - the two are indeed isomorphic but as readers will know - I do not see this as an excuse.

What is defined here may also be called the Geometric tangent space

Definition

It is the set of arrows at a point, the set of all directions essentially. As the reader knows, a vector is usually just a direction, we keep track of tangent vectors and know them to be "tangent vectors at t" or something similar. A tangent vector is actually a point with an associated direction.

Euclidean (motivating) definition

We define $T_p(\mathbb{R}^n)=\left\{(p,v)|v\in\mathbb{R}^n\right\}$

Generally then we may say: $T_p(A)=\left\{(p,v)|v\in A\right\}$

Notation

A tangent vector (often $v$ is used) shall be left as just $v$ if the point to which it is a tangent to is implicit (ie " $v$ is a tangent at $p$ ")

Rather than writing $(p,v)$ we may write:

$v$ (if it is implicitly understood that this is a tangent to the point $p$ )
$v_a$
$v|_a$

Why ordered pairs

Ordered pairs are used because now the tangent space at two distinct points are disjoint sets, that is $\alpha\ne\beta\implies T_\alpha(A)\cap T_\beta(A)=\emptyset$

Vector space

$T_p(A)$ is a vector space when equipped with the following definitions:

$v_a+w_a=(v+w)_a$
$c(v_a)=(cv)_a$

It is easily seen that the basis for this is the standard basis and that the tangent space $T_p(A)$ is basically just a copy of $A$

References

Jump up ↑ Alec's notation - John M Lee uses $\mathbb{R}^n_p$ and it is distinct from $T_p(\mathbb{R}^n)$
Jump up ↑ John M. Lee - Introduction to Smooth Manifolds - second edition

[1] Jump up ↑ Alec's notation - John M Lee uses $\mathbb{R}^n_p$ and it is distinct from $T_p(\mathbb{R}^n)$

[2] Jump up ↑ John M. Lee - Introduction to Smooth Manifolds - second edition

[1]

[2]

Tangent space

Contents

Types of tangent space

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Definition

Euclidean (motivating) definition

Notation

Why ordered pairs

Vector space

See also

References

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