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Talk:Lefschetz fixed-point theorem

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Lefschetz number

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is defined arbitrarily for maps , then if we use the identity map we get is the intersection number of the diagonal with itself in the product manifold , i.e., the Euler characteristic. On the algebraic topological level I'm sure this holds too, that . Anyone know more about this? MotherFunctor 05:55, 28 May 2006 (UTC)[reply]

The connection is now explained.24.58.63.18 (talk) 19:07, 4 June 2009 (UTC)[reply]

References for the statements about Frobenius

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it would be nice to have a reference (to look up proofs) for the statements about the Frobenius. --79.83.77.245 (talk) 00:49, 19 January 2010 (UTC)[reply]