Products Outer Product

41 The outer product of two tensors (not necessarily of the same type or order) is a set of tensor components obtained simply by writing the components of the two tensors beside each other with no repeated indices (that is by multiplying each component of one of the tensors by every component of the other). For example

aibj

= T ■

(1.55-a)

Ai B.k

= CiM.j

(1.55-b)

ViTjk

Sij k

(1.55-c)

0 0

Post a comment