1. The KLT relation from the tree formula and permutohedron.
- Author
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Cao, Qu and Zhang, Liang
- Subjects
- *
PERMUTATION groups , *HOPF algebras , *TREE graphs , *GROUP algebras , *TREES - Abstract
In this paper, we generalize the Nguyen–Spradlin–Volovich–Wen (NSVW) tree formula from the MHV sector to any helicity sector. We find a close connection between the Permutohedron and the KLT relation, and construct a non-trivial mapping between them, linking the amplitudes in the gauge and gravity theories. The gravity amplitude can also be mapped from a determinant followed from the matrix-tree theorem. Besides, we use the binary tree graphs to manifest its Lie structure. In our tree formula, there is an evident Hopf algebra of the permutation group behind the gravity amplitudes. Using the tree formula, we can directly re-derive the soft/collinear limit of the amplitudes. [ABSTRACT FROM AUTHOR]
- Published
- 2023
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