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  <h1>Glossar zur Linearen Algebra</h1>
  <p><a href="a.html">A</a>
	<a href="b.html">B</a> <a href="c.html">C </a><a href="d.html">D</a> <a href="e.html">E</a>
	<a href="f.html">F</a> <a href="g.html">G</a> <a href="h.html">H</a>	<a href="j.html">I</a>
	<span class="important" style="font-weight: bold">J</span> <a href="k.html">K</a> <a href="l.html">L</a> <a href="m.html">M</a>
	<a href="n.html">N</a> <a href="o.html">O</a> <a href="p.html">P</a> <a href="q.html">Q</a>
	<a href="r.html">R</a> <a href="s.html">S</a> <a href="t.html">T</a> <a href="u.html">U</a>
	<a href="v.html">V</a> W X Y <a href="z.html">Z</a></p>
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        <td>Ausdruck</td>                 
        <td>Definition</td>                  
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        <td>Jordansche Normalform </td>
        <td>Zu jeder (n,n) -Matrix 
          A gibt eine eine regul&#228;re Matrix X 
          , so dass <span class="nowrap">J : = X <sup>- 
          1</sup>AX</span> eine Blockdiagonalmatrix<span class="nowrap"> J 
          = diag {J<sub>1</sub>,...,J<sub>m</sub>}</span>          ist und die Diagonalbl&#246;cke J<sub>k</sub> die 
          Gestalt 
          <p align="CENTER"> J<sub>k</sub> = <img width="198" height="99" align="MIDDLE" border="0" src="mat_zeichen/img33.gif" alt="$\displaystyle\left(\begin{array}{ccccc}\lambda_k&1&0&\dots&0\\ 0&\lambda_k&...\vdots&\vdots&\ddots&\ddots&\vdots\\ 0&0&0&\dots&\lambda_k\end{array}\right)$">
					</p>
          besitzen. J hei&#223;t die Jordansche Normalform 
        von A . </td>
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