In other words the monodromy is a two dimensional linear representation of the fundamental group.

Nearby was a linear representation of the blocked tunnel and the cavern.

Hierarchical representations of sequences have an edge over linear representations.

Now he could also see drawings on the side of the cylinder, simple linear representations of various shapes.

It was initially defined as a construction by Frobenius, for linear representations of finite groups.

If the object is a vector space we have a linear representation.

These can be described as "linear representations up to scalar transformations".

In both of these linear representations the modulus is given by the determinant function.

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

Absolutely irreducible is also applied, with the same meaning to linear representations of algebraic groups.