Positive geometry, local triangulations, and the dual of the Amplituhedron

There is a remarkable connection between the boundary structure of the positive kinematic region and branch points of integrated amplitudes in planar $$ \mathcal{N} $$ N = 4 SYM. A long-standing question has been precisely how algebraic branch points emerge from this picture. We use wall crossing and scattering diagrams to systematically study the boundary structure of the positive kinematic regions associated with MHV amplitudes. The notion of asymptotic chambers in the scattering diagram naturally explains the appearance of algebraic branch points. Furthermore, the scattering diagram construction also motivates a new coordinate system for kinematic space that rationalizes the relations between algebraic letters in the symbol alphabet. As a direct application, we conjecture a complete list of all algebraic letters that could appear in the symbol alphabet of the 8-point MHV amplitude.

Section: Jhep07(2021)049mentioning

confidence: 99%

Algebraic branch points at all loop orders from positive kinematics and wall crossing

Herderschee

2021

“…The boundaries which are shared are oriented oppositely, and therefore they are not present in the oriented sum. Interestingly, this particular scenario has already been exploited in [10] for the amplituhedron-like geometries related to one-loop integrands. (II) Combinations of two geometries not giving a positive geometry.…”

Section: Jhep07(2021)111mentioning

confidence: 99%

Kleiss-Kuijf relations from momentum amplituhedron geometry

Damgaard

Ferro

Łukowski

et al. 2021

In recent years, it has been understood that color-ordered scattering amplitudes can be encoded as logarithmic differential forms on positive geometries. In particular, amplitudes in maximally supersymmetric Yang-Mills theory in spinor helicity space are governed by the momentum amplituhedron. Due to the group-theoretic structure underlying color decompositions, color-ordered amplitudes enjoy various identities which relate different orderings. In this paper, we show how the Kleiss-Kuijf relations arise from the geometry of the momentum amplituhedron. We also show how similar relations can be realised for the kinematic associahedron, which is the positive geometry of bi-adjoint scalar cubic theory.

“…• Another interesting direction would be to extend the methods developed in this paper to loop amplitudes. When loop amplitudes of planar N = 4 SYM are represented in momentum twistor space, they can be expressed in terms of chiral pentagon in-JHEP01(2021)181 tegrals [39], which were recently proposed to be building blocks for a dual Amplituhedron [53]. It would be interesting to see if such integrals can be used to describe sugra amplitudes.…”

Section: Discussionmentioning

confidence: 99%

$$ \mathcal{N} $$ = 7 On-shell diagrams and supergravity amplitudes in momentum twistor space

Armstrong

Farrow

Lipstein

2021

We derive an on-shell diagram recursion for tree-level scattering amplitudes in $$ \mathcal{N} $$ N = 7 supergravity. The diagrams are evaluated in terms of Grassmannian integrals and momentum twistors, generalising previous results of Hodges in momentum twistor space to non-MHV amplitudes. In particular, we recast five and six-point NMHV amplitudes in terms of $$ \mathcal{N} $$ N = 7 R-invariants analogous to those of $$ \mathcal{N} $$ N = 4 super-Yang-Mills, which makes cancellation of spurious poles more transparent. Above 5-points, this requires defining momentum twistors with respect to different orderings of the external momenta.