The S3 Sasaki Join Construction

Abstract

The main purpose of this work is to generalize the S3 Sasaki join construction M S3 described in BoTo14a when the Sasakian structure on M is regular, to the general case where the Sasakian structure is only quasi-regular. This gives one of the main results, Theorem 3.2, which describes an inductive procedure for constructing Sasakian metrics of constant scalar curvature. In the Gorenstein case (c1()=0) we construct a polynomial whose coeffients are linear in the components of and whose unique root in the interval (1,∞) completely determines the Sasaki-Einstein metric. In the more general case we apply our results to prove that there exists infinitely many smooth 7-manifolds each of which admit infinitely many inequivalent contact structures of Sasaki type admitting constant scalar curvature Sasaki metrics (see Corollary 6.15). We also discuss the relationship with a recent paper ApCa18 of Apostolov and Calderbank as well as the relation with K-stability.