Cosmetic Surgery in Integral Homology L-Spaces
Abstract
Let K be a non-trivial knot in S3, and let r and r' be two distinct rational numbers of same sign, allowing r to be infinite; we prove that there is no orientation-preserving homeomorphism between the manifolds S3r(K) and S3r'(K). We further generalize this uniqueness result to knots in arbitrary integral homology L-spaces.
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