Kirby diagrams for an infinite family of exotic R4's

Abstract

Eli, Hom, and Lidman showed that the manifolds produced by attaching the simplest positive Casson handle CH+ to a slice disc complement of the ribbon knot T2,n\#T2,-n for n3 and odd, and removing the boundary, form a countably infinite family of exotic R4's. They provided a Kirby diagram for the case n=3. In this short note, we extend this for n3 and odd, and provide Kirby diagrams for two such families of exotic R4's, which are then shown to be equivalent. We then generalise these diagrams to a family of exotic R4's built using ribbon disc complements of the pretzel knots P(n,-n,2k).