Pappus' configuration in non commutative projective geometry with application to a theorem of A. Schleiermacher (Q2569600)
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| English | Pappus' configuration in non commutative projective geometry with application to a theorem of A. Schleiermacher |
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Pappus' configuration in non commutative projective geometry with application to a theorem of A. Schleiermacher (English)
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26 April 2006
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Let \(\pi\) be a Desarguesian projective plane. The author proves the following theorem: Assume that every projectivity of a given line which is a product of at most \(3\) perspectivities and has \(n\) fixed points is the identity.Then Pappus Theorem holds in \(\pi\).
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