Litcius/Paper detail

Cohen-Macaulay Property of Feynman Integrals

Felix Tellander, Martin Helmer

2022Communications in Mathematical Physics13 citationsDOIOpen Access PDF

Abstract

Abstract The connection between Feynman integrals and GKZ A -hypergeometric systems has been a topic of recent interest with advances in mathematical techniques and computational tools opening new possibilities; in this paper we continue to explore this connection. To each such hypergeometric system there is an associated toric ideal, we prove that the latter has the Cohen-Macaulay property for two large families of Feynman integrals. This implies, for example, that both the number of independent solutions and dynamical singularities are independent of space-time dimension and generalized propagator powers. Furthermore, in particular, it means that the process of finding a series representation of these integrals is fully algorithmic.

Topics & Concepts

PropagatorFeynman diagramFeynman integralProperty (philosophy)MathematicsConnection (principal bundle)Dimension (graph theory)Hypergeometric distributionPure mathematicsGravitational singularityHypergeometric functionRepresentation (politics)Algebra over a fieldMathematical physicsMathematical analysisGeometryPolitical scienceLawEpistemologyPoliticsPhilosophyCommutative Algebra and Its ApplicationsPolynomial and algebraic computationAlgebraic Geometry and Number Theory
Cohen-Macaulay Property of Feynman Integrals | Litcius