Quadratic formations (Ex)

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This exercise is taken from [Ranicki2002, p. 318] and we use the notation found there.

Show that the graphs $<wikitex>; This exercise is taken from {{citeD|Ranicki2002|p. 318}} and we use the notation found there. Show that the graphs $\Gamma_{(K, \lambda)}$ of -$\epsilon$-quadratic forms $(K,\lambda, \mu)$ are precisely the Lagrangians of $H_\epsilon(K)$ which are the direct complements of $K^*$. </wikitex> == References == {{#RefList:}} [[Category:Exercises]]\Gamma_{(K, \lambda)}$ of - $\epsilon$ -quadratic forms $(K,\lambda, \mu)$ are precisely the Lagrangians of $H_\epsilon(K)$ which are the direct complements of $K^*$ .

Quadratic formations (Ex)

Revision as of 14:58, 1 April 2012

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 Show that the graphs $\Gamma_{(K, \lambda)}$ of -$\epsilon$-quadratic forms $(K,\lambda, \mu)$ are precisely the Lagrangians of $H_\epsilon(K)$ which are the direct complements of $K^*$.
 </wikitex>
-== References ==
+<!-- == References ==
-{{#RefList:}}
+{{#RefList:}} -->
 [[Category:Exercises]]
+[[Category:Exercises without solution]]