A 2-dimensional matching can be defined in a completely analogous manner.

Below we discuss the case of finite groups, but the general compact case is completely analogous.

In the continuous case, the results are completely analogous.

The bonding situation is completely analogous to that in pyrrole.

We prove the second identity; the first is completely analogous.

Similar constructs are rare in Germanic languages and not completely analogous.

It is completely analogous to a lot of business situations.

The proof in the contravariant case is completely analogous.

This is completely analogous to the more traditional case of a magnetic impurity in a metal.

A completely analogous definition holds for the case of linear representations of G.