The number of master integrals is finite

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• Twisted Feynman Integrals: from generating functions to spin-resummed post-Minkowskian dynamics hep-th · 2025-12-24 · unverdicted · none · ref 108 · internal anchor

  Twisted Feynman integrals are introduced with graded Symanzik polynomials, classified as exponential periods, and shown to have geometry not inferable from generalized Baikov leading singularities.

• Feynman integral reduction by covariant differentiation hep-ph · 2026-04-10 · unverdicted · none · ref 3

  Covariant differentiation on the dual vector space spanned by master integrals reduces a large class of Feynman integrals to masters, with connections reusable across mass configurations.

• Discrete symmetries of Feynman integrals hep-th · 2026-04-09 · unverdicted · none · ref 45

  Discrete symmetries of Feynman integral families correspond to permutations of Feynman parameters and induce group actions on twisted cohomology whose characters are Euler characteristics of fixed-point sets, yielding a formula for master integral counts in symmetric banana diagrams up to four loops

• Planar master integrals for two-loop NLO electroweak light-fermion contributions to $g g \rightarrow Z H$ hep-ph · 2026-04-30 · unverdicted · none · ref 39

  Analytic expressions for the planar master integrals in two-loop NLO EW light-fermion contributions to gg → ZH are derived via canonical differential equations and expressed using Goncharov polylogarithms or one-fold integrals over them.

• Picard-Fuchs Equations of Twisted Differential forms associated to Feynman Integrals math.AG · 2026-04-10 · unverdicted · none · ref 27

  An extension of the Griffiths-Dwork algorithm produces twisted Picard-Fuchs operators for hypergeometric, elliptic, and Calabi-Yau motives from families of Feynman integrals.