| 11. | Multilinear algebra can be developed in greater generality than for scalars coming from a ring.
|
| 12. | This can be mathematically seen through one aspect of tensors-they are multilinear functions.
|
| 13. | Thus the components of the tensor product of multilinear forms can be computed by the Kronecker product.
|
| 14. | In mathematics, "'multilinear algebra "'extends the methods of linear algebra.
|
| 15. | Multilinear maps can be described via tensor products of elements of " V " � ".
|
| 16. | When described as multilinear maps, the tensor product simply multiplies the two tensors, i . e.
|
| 17. | Some constructions of multilinear algebra are of'mixed'variance, which prevents them from being functors.
|
| 18. | Multilinear Subspace learning can be applied to observations whose measurements were vectorized and organized into a data tensor,
|
| 19. | A multilinear map of one variable is a linear map, and of two variables is a bilinear map.
|
| 20. | If the codomain of a multilinear map is the field of scalars, it is called a multilinear form.
|
