More Exotic RP2-knots and Homotopy Spheres
Abstract
We extend the infinite family of exotic embeddings RP2 S4 constructed by Miyazawa to a strictly larger family of exotic embeddings, by showing that in place of the pretzel knot P(-2, 3, 7), an infinite family of knots may be used as input to the construction. To this end, we prove that for any Montesinos knot of the form K(2,3,|6s+1|), the branched double cover of the corresponding roll-spun knot is a homotopy sphere. This in turn produces a larger family of homotopy spheres and homotopy CP2s with potentially interesting involutions. We also observe that Miyazawa's homotopy sphere can be obtained from S4 by a Gluck twist.
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