Metric bundle

Definition

Standard definition

Let ${\displaystyle M}$ be a differential manifold. A metric bundle on ${\displaystyle M}$ is the following data:

• A vector bundle ${\displaystyle E}$ over ${\displaystyle M}$
• For every point ${\displaystyle p\in M}$, a symmetric positive-definite bilinear form on the vector space ${\displaystyle E(p)}$ over ${\displaystyle p}$, that varies smoothly with ${\displaystyle p}$.

Definition as a section

A metric on ${\displaystyle E}$ is defined as a section of the bundle ${\displaystyle Sym^{2}(E^{*})}$, with the property that the value of the section at every point is positive-definite. Note that a section of ${\displaystyle Sym^{2}(E^{*})}$ is precisely the same thing as associating, to every point of ${\displaystyle M}$, a symmetric bilinear form. The condition of positive-definiteness needs to be imposed additionally to get a metric.

Related notions

Space of metrics on a bundle

Further information: space of metrics on a bundle

Given any vector bundle over a differential manifold, we can look at the space of metrics on it. This space lives as a subset (not a vector subspace) of the space of sections of ${\displaystyle Sym^{2}(E^{*})}$.