Berglund-Hübsch transpose and Sasaki-Einstein rational homology 7-spheres. (English) Zbl 07900818
Summary: We show that links of isolated hypersurface singularities defined by invertible polynomials coming from the Johnson and Kollár list of Kähler-Einstein 3-folds that are rational homology 7-spheres [J. M. Johnson and J. Kollár, Exp. Math. 10, No. 1, 151–158 (2001; Zbl 0972.14034)] remain rational homology 7-spheres under the so-called Berglund-Hübsch transpose rule coming from classical mirror symmetry constructions. Actually, this rule produces twins, that is, links with same degree, Milnor number and homology \(H_3\), with the exception of iterated Thom-Sebastiani sums of singularities of chain and cycle type, where the torsion and the Milnor number vary. The Berglund-Hübsch transpose rule not only gives a framework to better understand the existence of Sasaki-Einstein twins but also gives a mechanism for producing new examples of Sasaki-Einstein twins in the rational homology 7-sphere setting. We also give reasonable conditions for a Sasaki-Einstein rational homology 7-sphere to remain Sasaki-Einstein under the Berglund-Hübsch transpose rule. In particular, we found 75 new examples of Sasaki-Einstein rational homology 7-spheres arising as links of not well-formed hypersurface singularities.
Keywords:
hypersurface singularities; rational homology \(7\)-spheres; Berglund-Hübsch transpose; Sasaki-Einstein manifoldsCitations:
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