Mixed tensor

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In tensor analysis, a mixed tensor is a tensor which is neither covariant nor contravariant. At least one of the indices of a mixed tensor will be a subscript (covariant) and at least one of the indices will be a superscript (contravariant).

A mixed tensor of type  \begin{pmatrix} M \\ N \end{pmatrix} , with both M > 0 and N > 0, is a tensor which has M contravariant indices and N covariant indices. Such tensor can be defined as a linear function which maps an M+N-tuple of M one-forms and N vectors to a scalar.

[edit] Index raising and lowering

Consider the following octet of related tensors:

 T_{\alpha \beta \gamma}, \ T_{\alpha \beta} {}^\gamma, \ T_\alpha {}^\beta {}_\gamma, \ 
T_\alpha {}^{\beta \gamma}, \ T^\alpha {}_{\beta \gamma}, \ T^\alpha {}_\beta {}^\gamma, \ 
T^{\alpha \beta} {}_\gamma, \ T^{\alpha \beta \gamma} .

The first one is covariant, the last one contravariant, and the remaining ones mixed. Notationally, these tensors differ from each other by the covariance/contravariance of their indices. A given contravariant index of a tensor can be lowered using the metric tensor gμν, and a given covariant index can be raised using the inverse metric tensor gμν. Thus, gμν could be called the index lowering operator and gμν the index raising operator.

Generally, the covariant metric tensor, contracted with a tensor of type \begin{pmatrix} M \\ N \end{pmatrix} , yields a tensor of type  \begin{pmatrix} M - 1 \\ N + 1 \end{pmatrix} , whereas its contravariant inverse, contracted with a tensor of type \begin{pmatrix} M \\ N \end{pmatrix} , yields a tensor of type  \begin{pmatrix} M + 1 \\ N - 1 \end{pmatrix} .

[edit] Examples

As an example, a mixed tensor of type  \begin{pmatrix} 1 \\ 2 \end{pmatrix} can be obtained by raising an index of a covariant tensor of type  \begin{pmatrix} 0 \\ 3 \end{pmatrix} ,

 T_{\alpha \beta} {}^\tau = T_{\alpha \beta \gamma} \, g^{\gamma \tau} ,

where Tαβτ is the same tensor as Tαβγ, because

  T_{\alpha \beta} {}^\tau \, \delta_\tau {}^\gamma = T_{\alpha \beta} {}^\gamma ,

with Kronecker δ acting here like an identity matrix.

Likewise,

 T_\alpha {}^\tau {}_\gamma = T_{\alpha \beta \gamma} \, g^{\beta \tau},
 T_\alpha {}^{\tau \epsilon} = T_{\alpha \beta \gamma} \, g^{\beta \tau} \, g^{\gamma \epsilon},
 T^{\alpha \beta} {}_\gamma = g_{\gamma \tau} \, T^{\alpha \beta \tau},
 T^\alpha {}_{\tau \epsilon} = g_{\tau \beta} \, g_{\epsilon \gamma} \, T^{\alpha \beta \gamma}.

Raising an index of the metric tensor is equivalent to contracting it with its inverse, yielding the Kronecker delta,

 g^{\mu \lambda} \, g_{\lambda \nu} = g^\mu {}_\nu = \delta^\mu {}_\nu ,

so any mixed version of the metric tensor will be equal to the Kronecker delta, which will also be mixed.

[edit] See also