Every connected sum of lens spaces is a real component of a uniruled algebraic variety

Fr\'ed\'eric Mangolte (LM-Savoie); Johannes Huisman (LM)

arxiv: math/0412159 · v2 · submitted 2004-12-08 · 🧮 math.AG

Every connected sum of lens spaces is a real component of a uniruled algebraic variety

Johannes Huisman (LM) , Fr\'ed\'eric Mangolte (LM-Savoie) This is my paper

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keywords connectedalgebraiccomponentlensrealspacesuniruledvariety

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Let M be a connected sum of finitely many lens spaces, and let N be a connected sum of finitely many copies of S^1xS^2. We show that there is a uniruled algebraic variety X such that the connected sum M#N of M and N is diffeomorphic to a connected component of the set of real points X(R) of X. In particular, any finite connected sum of lens spaces is diffeomorphic to a real component of a uniruled algebraic variety.

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Every connected sum of lens spaces is a real component of a uniruled algebraic variety

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