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Parity duality for the amplituhedron

Pavel Galashin, Thomas Lam

2020Compositio Mathematica27 citationsDOIOpen Access PDF

Abstract

The (tree) amplituhedron $\mathcal {A}_{n,k,m}(Z)$ is a certain subset of the Grassmannian introduced by Arkani-Hamed and Trnka in 2013 in order to study scattering amplitudes in $N=4$ supersymmetric Yang–Mills theory. Confirming a conjecture of the first author, we show that when $m$ is even, a collection of affine permutations yields a triangulation of $\mathcal {A}_{n,k,m}(Z)$ for any $Z\in \operatorname {Gr}_{>0}(k+m,n)$ if and only if the collection of their inverses yields a triangulation of $\mathcal {A}_{n,n-m-k,m}(Z)$ for any $Z\in \operatorname {Gr}_{>0}(n-k,n)$ . We prove this duality using the twist map of Marsh and Scott. We also show that this map preserves the canonical differential forms associated with the corresponding positroid cells, and hence obtain a parity duality for amplituhedron differential forms.

Topics & Concepts

MathematicsGrassmannianDuality (order theory)ConjectureAffine transformationTwistPure mathematicsDifferential formTriangulationCombinatoricsCanonical formSchubert calculusParity (physics)SuperpotentialSupersymmetryOrder (exchange)Coxeter groupDifferential geometryScattering amplitudeAdvanced Combinatorial MathematicsAlgebraic structures and combinatorial modelsAdvanced Algebra and Geometry
Parity duality for the amplituhedron | Litcius