Invariant Real Subspaces
Definition
A subspace $S \subset \R ^n$ is
invariant (an
invariant subspace) under
the linear transformation $A$ if
\[
x \in S \Rightarrow Ax \in S.
\]
A subspace $S \subset \R ^n$ is
invariant (an
invariant subspace) under
the linear transformation $A$ if
\[
x \in S \Rightarrow Ax \in S.
\]