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The Two-Loop Remainder Function for Eight and Nine Particles

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arxiv 2104.14194 v1 pith:6NX57QFN submitted 2021-04-29 hep-th

The Two-Loop Remainder Function for Eight and Nine Particles

classification hep-th
keywords amplitudesformsfunctionknownremainderstructuretwo-loopadditive
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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Two-loop MHV amplitudes in planar ${\cal N} = 4$ supersymmetric Yang Mills theory are known to exhibit many intriguing forms of cluster-algebraic structure. We leverage this structure to upgrade the symbols of the eight- and nine-particle amplitudes to complete analytic functions. This is done by systematically projecting onto the components of these amplitudes that take different functional forms, and matching each component to an ansatz of multiple polylogarithms with negative cluster-coordinate arguments. The remaining additive constant can be determined analytically by comparing the collinear limit of each amplitude to known lower-multiplicity results. We also observe that the nonclassical part of each of these amplitudes admits a unique decomposition in terms of a specific $A_3$ cluster polylogarithm, and explore the numerical behavior of the remainder function along lines in the positive region.

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