Evaluating the six-point remainder function near the collinear limit
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Publication:2940674
DOI10.1142/S0217751X14501541zbMath1303.81193arXiv1406.1123WikidataQ60140132 ScholiaQ60140132MaRDI QIDQ2940674
Publication date: 20 January 2015
Published in: International Journal of Modern Physics A (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1406.1123
Supersymmetric field theories in quantum mechanics (81T60) Yang-Mills and other gauge theories in quantum field theory (81T13) Strong interaction, including quantum chromodynamics (81V05) Quantum scattering theory (81U99)
Related Items (9)
Singularities of eight- and nine-particle amplitudes from cluster algebras and tropical geometry ⋮ A Young diagram expansion of the hexagonal Wilson loop (amplitude) in \(\mathcal{N} = 4\) SYM ⋮ The contribution of scalars to \(\mathcal{N} = 4\) SYM amplitudes. II: Young tableaux, asymptotic factorisation and strong coupling ⋮ Six-point remainder function in multi-Regge-kinematics: an efficient approach in momentum space ⋮ The double pentaladder integral to all orders ⋮ Hexagon bootstrap in the double scaling limit ⋮ Six-gluon amplitudes in planar \(\mathcal{N} = 4\) super-Yang-Mills theory at six and seven loops ⋮ Fermions and scalars in \(\mathcal{N} = 4\) Wilson loops at strong coupling and beyond ⋮ The SAGEX review on scattering amplitudes Chapter 5: Analytic bootstraps for scattering amplitudes and beyond
Cites Work
- The four-loop remainder function and multi-Regge behavior at NNLLA in planar \( \mathcal{N} = 4\) super-Yang-Mills theory
- Hexagon Wilson loop OPE and harmonic polylogarithms
- Scattering amplitudes: the most perfect microscopic structures in the universe
- Nested sums, expansion of transcendental functions, and multiscale multiloop integrals
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