Notes on polytopes, amplitudes and boundary configurations for Grassmannian string integrals

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: Critically Positive Coordinates and Cluster Algebrasmentioning

confidence: 99%

“…One path is investigating the explicit calculations in ref. [90] that connect boundary points of Gr(k, n)/T to f i using generalized scattering equations.…”

Section: Jhep07(2021)049mentioning

confidence: 99%

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

Herderschee

2021

“…Some progress has been made for more general φ p scalar theories [43][44][45][46][47][48][49][50]. Positive geometry was tied to certain one-loop integrands [51], string amplitudes [52][53][54][55][56] as well as cosmological [57,58] or CFT correlators [59].…”

Section: Introductionmentioning

confidence: 99%

Towards the Gravituhedron: new expressions for NMHV gravity amplitudes

Trnka

2021

In this paper, we present new expressions for n-point NMHV tree-level gravity amplitudes. We introduce a method of factorization diagrams which is a simple graphical representation of R-invariants in Yang-Mills theory. We define the gravity analogues which we call $$ \mathcal{G} $$ G -invariants, and expand the NMHV gravity amplitudes in terms of these objects. We provide explicit formulas of NMHV gravity amplitudes up to eight points in terms of $$ \mathcal{G} $$ G -invariants, and give the general definition for any number of points. We discuss the connection to BCFW representation, special behavior under large momentum shift, the role of momentum twistors and the intricate web of spurious poles cancelation. Because of the close connection between R-invariants and the (tree-level) Amplituhedron for Yang-Mills amplitudes, we speculate that the new expansion for gravity amplitudes should correspond to the triangulation of the putative Gravituhedron geometry.

“…Moduli space of open string worldsheet is an associahedron, and the scattering equations of CHY act as diffeomorphism between the associahedron in the worldsheet and that described in the kinematic space. This led to a fascinating series of investigations into the connection between scattering amplitudes and positive geometries for various scalar theories [64][65][66][67][68][69][70][71][72][73][74][75][76][77][78]. Stringy deformations of the scattering forms have been considered in [79].…”

Section: Introductionmentioning

confidence: 99%

One-loop integrand from generalised scattering equations

Abhishek

Hegde

Saha

2021

Generalised bi-adjoint scalar amplitudes, obtained from integrations over moduli space of punctured ℂℙk − 1, are novel extensions of the CHY formalism. These amplitudes have realisations in terms of Grassmannian cluster algebras. Recently connections between one-loop integrands for bi-adjoint cubic scalar theory and $$ {\mathcal{D}}_n $$ D n cluster polytope have been established. In this paper using the Gr (3, 6) cluster algebra, we relate the singularities of (3, 6) amplitude to four-point one-loop integrand in the bi-adjoint cubic scalar theory through the $$ {\mathcal{D}}_4 $$ D 4 cluster polytope. We also study factorisation properties of the (3, 6) amplitude at various boundaries in the worldsheet.