Homology spheres with E8-fillings and arbitrarily large correction terms
Abstract
In this paper we construct families of homology spheres which bound 4-manifolds with intersection forms isomorphic to -E8. We show that these families have arbitrary large correction terms. This result says that among homology spheres, the difference of the maximal rank of minimal sub-lattice of definite filling and the maximal rank of even definite filling is arbitrarily large.
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