Journal article
Sphere Partition Function of Calabi–Yau GLSMs
D Erkinger, J Knapp
Communications in Mathematical Physics | SPRINGER | Published : 2022
Open access
Abstract
The sphere partition function of Calabi–Yau gauged linear sigma models (GLSMs) has been shown to compute the exact Kähler potential of the Kähler moduli space of a Calabi–Yau. We propose a universal expression for the sphere partition function evaluated in hybrid phases of Calabi–Yau GLSMs that are fibrations of Landau–Ginzburg orbifolds over some base manifold. Special cases include Calabi–Yau complete intersections in toric ambient spaces and Landau–Ginzburg orbifolds. The key ingredients that enter the expression are Givental’s I/J-functions, the Gamma class and further data associated to the hybrid model. We test the proposal for one- and two-parameter abelian GLSMs, making connections, ..
View full abstractGrants
Awarded by Fiona Wood Foundation
Funding Acknowledgements
We would like to thank Mauricio Romo, Emanuel Scheidegger, and Thorsten Schimannek for discussions and comments on the manuscript. JK would like to thank Ilarion Melnikov for correspondence. DE thanks Urmi Ninad for discussions and the School of Mathematics and Statistics of the University of Melbourne for hospitality during a short-term stay. DE acknowledges financial support by the Vienna Doctoral School in Physics (VDSP). The authors were partially supported by the Austrian Science Fund (FWF): [P30904-N27]. All data generated or analysed during this study are included in this article.