halvvejs færdig med emne 5

2017-06-09 20:32:10 +02:00 · 2017-06-09 20:32:10 +02:00 · 44d89c801d
commit 44d89c801d
parent ac3215e746
1 changed files with 231 additions and 2 deletions
--- a/beviser.lyx
+++ b/beviser.lyx
@ -1921,7 +1921,11 @@ Hvis
 kan 
 \emph on
-udvides
+ud
 \emph default
 koordinattransformationsmatricer
 \emph on
 vides
 \emph default
 til en basis for 
 \begin_inset Formula $V$
@ -2249,5 +2253,230 @@ Noter
 Overvej at droppe Lemma 7.2 fra dispositionen.
 \end_layout
 \begin_layout Standard
 \begin_inset Newpage newpage
 \end_inset
 \end_layout
 \begin_layout Section
 Matrixrepræsentationer
 \end_layout
 \begin_layout Subsection
 Definition 8.3 (
 \emph on
 Koordinatvektor
 \emph default
 )
 \end_layout
 \begin_layout Standard
 \begin_inset Formula $\mathcal{V}=(\boldsymbol{v}_{1},\boldsymbol{v}_{2},\dots,\boldsymbol{v}_{n})$
 \end_inset
 er en basis for et 
 \begin_inset Formula $\mathbb{F}$
 \end_inset
 -vektorrum 
 \begin_inset Formula $V$
 \end_inset
 .
 \emph on
 Koordinatvektoren
 \emph default
 for et element 
 \begin_inset Formula $\boldsymbol{v}\in V$
 \end_inset
 mht.
 basen 
 \begin_inset Formula $\mathcal{V}$
 \end_inset
 menes elementet 
 \begin_inset Formula $L_{\mathcal{V}}^{-1}(\boldsymbol{v})\in\mathbb{F}^{n}$
 \end_inset
 .
 Koordinatvektoren kan også betegnes med 
 \begin_inset Formula $\left[\boldsymbol{v}\right]_{\mathcal{V}}$
 \end_inset
 \end_layout
 \begin_layout Standard
 Koordinatvektoren er den vektor
 \begin_inset Formula 
 \[
 \begin{pmatrix}\alpha_{1}\\
 \alpha_{2}\\
 \vdots\\
 \alpha_{n}
 \end{pmatrix}\in\mathbb{F}^{n}
 \]
 \end_inset
 som opfylder relationen
 \begin_inset Formula 
 \[
 \boldsymbol{v}=\alpha_{1}\cdot\boldsymbol{v}_{1}+\alpha_{2}\cdot\boldsymbol{v}_{2}+\cdots+\alpha_{n}\cdot\boldsymbol{v}_{n}.
 \]
 \end_inset
 \end_layout
 \begin_layout Subsection
 Definition 8.6 (
 \emph on
 Koordinattransformationsmatricen
 \emph default
 )
 \end_layout
 \begin_layout Standard
 Lad 
 \begin_inset Formula $\mathcal{V}=(\boldsymbol{v}_{1},\boldsymbol{v}_{2},\dots,\boldsymbol{v}_{n})$
 \end_inset
 og 
 \begin_inset Formula $\mathcal{W}=(\boldsymbol{w}_{1},\boldsymbol{w}_{2},\dots,\boldsymbol{w}_{n})$
 \end_inset
 være baser for det samme 
 \begin_inset Formula $\mathbb{F}$
 \end_inset
 -vektorrum 
 \begin_inset Formula $V$
 \end_inset
 .
 \emph on
 Koordinattransformationsmatricen for overgangen fra 
 \begin_inset Formula $\mathcal{W}$
 \end_inset
 -basen til 
 \begin_inset Formula $\mathcal{V}$
 \end_inset
 -basen defineres som matricen
 \begin_inset Formula 
 \[
 _{\underset{til}{\underbrace{\mathcal{V}}}}\left[\boxempty\right]_{\underset{fra}{\underbrace{\mathcal{W}}}}=\begin{pmatrix}\vline & \vline &  & \vline\\
 \left[\boldsymbol{w}_{1}\right]_{\mathcal{V}} & \left[\boldsymbol{w}_{2}\right]_{\mathcal{V}} & \cdots & \left[\boldsymbol{w}_{n}\right]_{\mathcal{V}}\\
 \vline & \vline &  & \vline
 \end{pmatrix}\in{\rm Mat_{n}(\mathbb{F})}
 \]
 \end_inset
 \end_layout
 \begin_layout Subsection
 Definition 8.9 (
 \emph on
 Matrixrepræsentation
 \emph default
 )
 \end_layout
 \begin_layout Standard
 Lad 
 \begin_inset Formula $L:\:W\rightarrow V$
 \end_inset
 betegne en lineær afbildning mellem 
 \begin_inset Formula $\mathbb{F}$
 \end_inset
 -vektorrum 
 \begin_inset Formula $W$
 \end_inset
 og 
 \begin_inset Formula $V$
 \end_inset
 med baser hhv.
 \begin_inset Formula $\mathcal{W}=(\boldsymbol{w}_{1},\boldsymbol{w}_{2},\dots,\boldsymbol{w}_{n})$
 \end_inset
 og 
 \begin_inset Formula $\mathcal{V}=(\boldsymbol{v}_{1},\boldsymbol{v}_{2},\dots,\boldsymbol{v}_{n})$
 \end_inset
 .
 \emph on
 Matrixrepræsentationen
 \emph default
 for 
 \begin_inset Formula $L$
 \end_inset
 mht.
 til baserne 
 \begin_inset Formula $\mathcal{W}$
 \end_inset
 og 
 \begin_inset Formula $\mathcal{V}$
 \end_inset
 defineres da som matricen
 \end_layout
 \begin_layout Standard
 \emph on
 \begin_inset Formula 
 \[
 _{\underset{til}{\underbrace{\mathcal{V}}}}\left[L\right]_{\underset{fra}{\underbrace{\mathcal{W}}}}=\begin{pmatrix}\vline & \vline &  & \vline\\
 \left[L(\boldsymbol{w}_{1})\right]_{\mathcal{V}} & \left[L(\boldsymbol{w}_{2})\right]_{\mathcal{V}} & \cdots & \left[(\boldsymbol{w}_{n})\right]_{\mathcal{V}}\\
 \vline & \vline &  & \vline
 \end{pmatrix}\in{\rm Mat_{n}(\mathbb{F})}
 \]
 \end_inset
 \end_layout
 \begin_layout Subsection
 Proposition 8.10(1) (Matrixrepræsentationer og koordinatvektorer)
 \end_layout
 \begin_layout Standard
 \begin_inset Formula 
 \[
 \left[L(\boldsymbol{v})\right]_{\mathcal{W}}={}_{\mathcal{V}}\left[L\right]_{\mathcal{W}}\cdot\left[\boldsymbol{v}\right]_{\mathcal{V}}.
 \]
 \end_inset
 \end_layout
 \begin_layout Subsection
 Lemma 8.19
 \end_layout
 \begin_layout Standard
 \end_layout
 \end_body
 \end_document