Associative submanifolds in twisted connected sum G2-manifolds
Abstract
We introduce a method to construct closed rigid associative submanifolds in twisted connected sum G2-manifolds. More precisely, we prove a gluing theorem of asymptotically cylindrical (ACyl) associative submanifolds in ACyl G2-manifolds under a transverse intersection hypothesis. This is analogous to the gluing theorem for G2-instantons introduced in [SW15]. We rephrase the hypothesis in the special cases where the ACyl associative submanifolds are obtained from holomorphic curves or special Lagrangians in ACyl Calabi-Yau 3-folds, in terms of algebraic-geometric conditions and topological conditions, respectively. This yields many rigid associative submanifolds with new topological types S3, R P3 or R P3\# R P3.
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