An irreducible real projective plane in the 4-sphere
Abstract
We construct an irreducible embedded projective plane in S4. This gives a counterexample to the Kinoshita conjecture and answers Problem 4.37 of the K3 problem list. Moreover, we answer both Questions (i) and (ii) of Problem 4.37: (i) the connected sum R\# R is a Klein bottle in S4 with extremal normal Euler number that does not admit an unknotted projective plane summand, and (ii) we show that our projective plane R is irreducible by showing that the peripheral map π1 (∂ (S4N(R))) π1 (S4 N(R)) has kernel of order 2.
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