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G4 flux, algebraic cycles and complex structure moduli stabilization

A. P. Braun, R. Valandro

2021Journal of High Energy Physics30 citationsDOIOpen Access PDF

Abstract

A bstract We construct G 4 fluxes that stabilize all of the 426 complex structure moduli of the sextic Calabi-Yau fourfold at the Fermat point. Studying flux stabilization usually requires solving Picard-Fuchs equations, which becomes unfeasible for models with many moduli. Here, we instead start by considering a specific point in the complex structure moduli space, and look for a flux that fixes us there. We show how to construct such fluxes by using algebraic cycles and analyze flat directions. This is discussed in detail for the sextic Calabi-Yau fourfold at the Fermat point, and we observe that there appears to be tension between M2-tadpole cancellation and the requirement of stabilizing all moduli. Finally, we apply our results to show that even though symmetric fluxes allow to automatically solve several F-term equations, they typically lead to flat directions.

Topics & Concepts

ModuliPhysicsConstruct (python library)Algebraic numberPure mathematicsPoint (geometry)Moduli spaceAlgebraic structureFlux (metallurgy)Fermat's Last TheoremTheoretical physicsAlgebra over a fieldStability (learning theory)Algebraic geometryModuli of algebraic curvesTension (geology)Black Holes and Theoretical PhysicsNonlinear Waves and SolitonsGeometry and complex manifolds