The orthogonal complement of an invariant subspace under a unitary operator is invariant
Let
Proof
Let
be an invariant subspace under . Then is also invariant under , and thus for any and as required.
This extends to a Unitary representation of a finite group easily. Since Every finite complex representation of a compact group is equivalent to a unitary representation, this doesn’t hold iff a representation is not unitary and non-finite.