Aspects of Scattering Amplitudes and Moduli Space Localization

Mizera, Sebastian

doi:10.1007/978-3-030-53010-5

Cited by 92 publications

(180 citation statements)

References 190 publications

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“…The strategy in proving (4.12) will be to rewrite the integral localizing on solutions of scattering equations to that localizing on boundaries of M 0,n corresponding to the Riemann surface degenerating into trivalent diagrams. While in flat space case there are multiple ways of arriving at such a result, see, e.g., [47,[63][64][65], here we cannot use them reliably for operator-valued scattering equations. In other words, we do not have a reliable way of solving these constraints explicitly, or even predicting how many solutions they might have.…”

Section: Computation With Residue Theoremsmentioning

confidence: 97%

“…Making this statement more precise will require a computation of the appropriate integrands coming from spin-1 and 2 vertex operators, which will be given in a future publication. Finally, it might be interesting to construct a version of our AdS model in the context of sectorized/chiral string [95][96][97][98][99][100], together with its intersection theory interpretation [65], which introduces a non-trivial α dependence to double-copy.…”

Section: Jhep11(2020)158mentioning

confidence: 99%

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Scattering equations in AdS: scalar correlators in arbitrary dimensions

Eberhardt

Komatsu

Mizera

2020

J. High Energ. Phys.

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We introduce a bosonic ambitwistor string theory in AdS space. Even though the theory is anomalous at the quantum level, one can nevertheless use it in the classical limit to derive a novel formula for correlation functions of boundary CFT operators in arbitrary space-time dimensions. The resulting construction can be treated as a natural extension of the CHY formalism for the flat-space S-matrix, as it similarly expresses tree-level amplitudes in AdS as integrals over the moduli space of Riemann spheres with punctures. These integrals localize on an operator-valued version of scattering equations, which we derive directly from the ambitwistor string action on a coset manifold. As a testing ground for this formalism we focus on the simplest case of ambitwistor string coupled to two cur- rent algebras, which gives bi-adjoint scalar correlators in AdS. In order to evaluate them directly, we make use of a series of contour deformations on the moduli space of punctured Riemann spheres and check that the result agrees with tree level Witten diagram computations to all multiplicity. We also initiate the study of eigenfunctions of scattering equations in AdS, which interpolate between conformal partial waves in different OPE channels, and point out a connection to an elliptic deformation of the Calogero-Sutherland model.

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Section: Computation With Residue Theoremsmentioning

confidence: 97%

Section: Jhep11(2020)158mentioning

confidence: 99%

Scattering equations in AdS: scalar correlators in arbitrary dimensions

Eberhardt

Komatsu

Mizera

2020

J. High Energ. Phys.

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“…Accompanying this line of work nearly simultaneously was the application of a novel class of mathematical objects known as twisted intersection numbers to the study of scattering amplitudes. Originally, the techniques of twisted intersection theory were used to study the KLT kernel in string theory [18], but have since been applied to general quantum field theories [19], Feynman integrals [20][21][22][23] and other aspects of scattering amplitudes, including recursion [24] and the double copy [25].…”

Section: Resmentioning

confidence: 99%

“…Indeed, the CHY formula is a special case of a twisted intersection number, in which the hyperplane arrangement yields the moduli space of marked Riemann spheres. For an extensive review of methods and formalism, the reader should consult [24]. One of the advantages of the method of twisted intersection numbers is the trivialization of identities such as the KLT relations, recasting them as statements of linear algebra.…”

Section: Resmentioning

confidence: 99%

“…Another very popular avatar of the double copy is due to Bern, Carrasco and Johansson (see [53][54][55][56] and references thereof and therein), in which the double copy is carried out at the level of individual Feynman diagrms, where kinematical and colour factors in the numerators obery identities that enable an essential 'squaring' of a gluon amplitude into a gravity amplitude. It has transpired of late that string amplitudes and intersection theory [24] may play a role in providing some insight into their origins. It may prove worthwhile to pursue this connection for theories with higher point interactions using the tools developed here.…”

Section: Jhep12(2020)057mentioning

confidence: 99%

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On polytopes and generalizations of the KLT relations

Kalyanapuram

2020

J. High Energ. Phys.

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We combine the technology of the theory of polytopes and twisted intersection theory to derive a large class of double copy relations that generalize the classical relations due to Kawai, Lewellen and Tye (KLT). To do this, we first study a generalization of the scattering equations of Cachazo, He and Yuan. While the scattering equations were defined on ℳ0, n — the moduli space of marked Riemann spheres — the new scattering equations are defined on polytopes known as accordiohedra, realized as hyperplane arrangements. These polytopes encode as patterns of intersection the scattering amplitudes of generic scalar theories. The twisted period relations of such intersection numbers provide a vast generalization of the KLT relations. Differential forms dual to the bounded chambers of the hyperplane arrangements furnish a natural generalization of the Bern-Carrasco-Johansson (BCJ) basis, the number of which can be determined by counting the number of solutions of the generalized scattering equations. In this work the focus is on a generalization of the BCJ expansion to generic scalar theories, although we use the labels KLT and BCJ interchangeably.

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Double Copy from Homotopy Algebras

Borsten

Kim

Jurčo

et al. 2021

Fortschritte der Physik

100

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We show that the BRST Lagrangian double copy construction of N=0 supergravity as the ‘square’ of Yang–Mills theory finds a natural interpretation in terms of homotopy algebras. We significantly expand on our previous work arguing the validity of the double copy at the loop level, and we give a detailed derivation of the double‐copied Lagrangian and BRST operator. Our constructions are very general and can be applied to a vast set of examples.

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Aspects of Scattering Amplitudes and Moduli Space Localization

Cited by 92 publications

References 190 publications

Scattering equations in AdS: scalar correlators in arbitrary dimensions

Scattering equations in AdS: scalar correlators in arbitrary dimensions

On polytopes and generalizations of the KLT relations

Double Copy from Homotopy Algebras

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