nLab
tensor

This is about tensor quantities in the sense of multilinear algebra, differential geometry and physics, as in tensor calculus. For the different notion of a tensor in enriched category theory see under copower.

Context

Category theory

Differential geometry

Definition
Examples
- General
- In differential geometry
Related concepts
References

Definition

Generally, a tensor is an element of a tensor product.

Traditionally this is considered in differential geometry for the following case:

for $X$ a manifold, $T X$ the tangent bundle, $T^* X$ the cotangent bundle, $\Gamma(T X)$ , $\Gamma(T^* X)$ their spaces of sections and $C(X)$ the associative algebra of functions on $X$ , a rank- $(p,q)$ tensor or tensor field on $X$ is an element of the tensor product of modules over $C(X)$

t \in \Gamma(T X)^{\otimes_{C(X)}^p} \otimes_{C(X)} \Gamma(T^* X)^{\otimes^q_{C(X)}} \,.

A rank $(p,0)$ -tensor is also called a covariant tensor and a rank $(0,q)$ -tensor a contravariant tensor.

Examples

General

(…)

In differential geometry

A vector field is a rank $(1,0)$ -tensor field.
A Riemannian metric is a symmetric rank $(0,2)$ -tensor.
A differential form of degree $n$ is a skew-symmetric rank $(0,n)$ -tensor.
A Poisson tensor is a skew-symmetric tensor of rank $(2,0)$ .

Related concepts

References

For instance section 2.4 of

Theodore Frankel, The Geometry of Physics - An Introduction

Last revised on April 20, 2016 at 05:00:18. See the history of this page for a list of all contributions to it.

nLab
tensor

Context

Category theory

Concepts

Universal constructions

Theorems

Extensions

Applications

Differential geometry

Contents

Definition

Examples

General

In differential geometry

Related concepts

References

nLab tensor

Context

Category theory

Concepts

Universal constructions

Theorems

Extensions

Applications

Differential geometry

Contents

Definition

Examples

General

In differential geometry

Related concepts

References

nLab
tensor