Litcius/Paper detail

A Calabi-Yau-to-curve correspondence for Feynman integrals

Hans Jockers, Sören Kotlewski, Pyry Kuusela, Andrew J. McLeod, Sebastian Pögel, Maik Sarve, Xing Wang, Stefan Weinzierl

2025Journal of High Energy Physics11 citationsDOIOpen Access PDF

Abstract

A bstract It has long been known that the maximal cut of the equal-mass four-loop banana integral is a period of a family of Calabi-Yau threefolds that depends on the kinematic variable z = m 2 / p 2 . We show that it can also be interpreted as a period of a family of genus-two curves. We do this by introducing a general Calabi-Yau-to-curve correspondence, which in this case locally relates the original period of the family of Calabi-Yau threefolds to a period of a family of genus-two curves that varies holomorphically with the kinematic variable z . In addition to working out the concrete details of this correspondence for the equal-mass four-loop banana integral, we outline when we expect a correspondence of this type to hold.

Topics & Concepts

Calabi–Yau manifoldPhysicsMathematical physicsFeynman diagramFeynman integralFeynman graphParticle physicsQuantum mechanicsAlgebraic Geometry and Number TheoryAdvanced Algebra and GeometryAdvanced Topics in Algebra