Linear Algebra/Self-Composition

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A linear transformations ${\displaystyle t:V\to V}$, because it has the same domain and codomain, can be iterated.^[1] That is, compositions of ${\displaystyle t}$ with itself such as ${\displaystyle t^2=t\circ t}$ and ${\displaystyle t^3=t\circ t\circ t}$ are defined.

Note that this power notation for the linear transformation functions dovetails with the notation that we've used earlier for their squared matrix representations because if ${\displaystyle {\mathrm{R}\mathrm{e}\mathrm{p}}_{B,B}(t)=T}$ then ${\displaystyle {\mathrm{R}\mathrm{e}\mathrm{p}}_{B,B}(t^j)=T^j}$.

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These examples suggest that on iteration more and more zeros appear until there is a settling down. The next result makes this precise.

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This graph illustrates Lemma 1.3. The horizontal axis gives the power ${\displaystyle j}$ of a transformation. The vertical axis gives the dimension of the rangespace of ${\displaystyle t^j}$ as the distance above zero— and thus also shows the dimension of the nullspace as the distance below the gray horizontal line, because the two add to the dimension ${\displaystyle n}$ of the domain.

As sketched, on iteration the rank falls and with it the nullity grows until the two reach a steady state. This state must be reached by the ${\displaystyle n}$-th iterate. The steady state's distance above zero is the dimension of the generalized rangespace and its distance below ${\displaystyle n}$ is the dimension of the generalized nullspace.

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/Solutions/

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