Bitensor

In differential geometry and general relativity, a bitensor (or bi-tensor^[1]) is a tensorial object that depends on two points in a manifold, as opposed to ordinary tensors which depend on a single point.^[2] Bitensors provide a framework for describing relationships between different points in spacetime and are used in the study of various phenomena in curved spacetime.

A bitensor is a tensorial object that depends on two points in a manifold, rather than on a single point as ordinary tensors do.^[3] A bitensor field ${\displaystyle B}$ can be formally defined as a map from the product manifold to an appropriate vector space ${\displaystyle B:M\times M\to V}$, where ${\displaystyle M}$ is a smooth manifold and ${\displaystyle V}$ is the vector space corresponding to the tensor space being considered.^[3][2]

In the language of fiber bundles, a bitensor of type ${\displaystyle (r,s,r',s')}$ is defined as a section of the exterior tensor product bundle ${\displaystyle T_{s}^{r}M\boxtimes T_{s'}^{r'}M}$, where ${\displaystyle T_{s}^{r}M}$ denotes the tensor bundle of rank ${\displaystyle (r,s)}$ and ${\displaystyle \boxtimes }$ represents the exterior tensor product ${\displaystyle B\in \Gamma (T_{s}^{r}M\boxtimes T_{s'}^{r'}M)}$, where ${\displaystyle \Gamma }$ denotes the space of sections.^[3]

The exterior tensor product bundle is constructed as ${\displaystyle {\mathcal {V}}_{1}\boxtimes {\mathcal {V}}_{2}=\mathrm {pr} _{1}^{*}{\mathcal {V}}_{1}\otimes \mathrm {pr} _{2}^{*}{\mathcal {V}}_{2}}$ where ${\displaystyle \mathrm {pr} _{i}}$ are projection operators that project onto the respective factors of the product manifold ${\displaystyle M\times M}$, and ${\displaystyle \mathrm {pr} _{i}^{*}}$ denotes the pullback of the respective bundles.^[3]

In coordinate notation, a bitensor ${\displaystyle T}$ with components ${\displaystyle T_{\alpha \beta '\ldots }^{\mu \nu '\ldots }(x,y)}$ has indices associated with two different points ${\displaystyle x}$ and ${\displaystyle y}$ in the manifold. By convention, unprimed indices (such as ${\displaystyle \mu }$, ${\displaystyle \alpha }$) refer to the first point, while primed indices (such as ${\displaystyle \nu '}$, ${\displaystyle \beta '}$) refer to the second point. The simplest example of a bitensor is a biscalar field, which is a scalar function of two points. Applications include parallel transport, heat kernels, and various Green's functions employed in quantum field theory in curved spacetime.^[3]

• Non-Euclidean geometry