Rijun Huang scite author profile

Using only the Britto-Cachazo-Feng-Witten(BCFW) on-shell recursion relation we prove color-order reversed relation, U (1)-decoupling relation, Kleiss-Kuijf(KK) relation and Bern-Carrasco-Johansson(BCJ) relation for color-ordered gauge amplitude in the framework of S-matrix program without relying on Lagrangian description. Our derivation is the first pure field theory proof of the new discovered BCJ identity, which substantially reduces the color ordered basis from (n − 2)! to (n − 3)!. Our proof gives also its physical interpretation as the mysterious bonus relation with 1 z 2 behavior under suitable on-shell deformation for no adjacent pair.

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Expansion of Einstein-Yang-Mills amplitude

Huang

et al. 2017

J. High Energ. Phys.

148

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Abstract:In this paper, we study from various perspectives the expansion of tree level single trace Einstein-Yang-Mills amplitudes into linear combination of color-ordered YangMills amplitudes. By applying the gauge invariance principle, a programable recursive construction is devised to expand EYM amplitude with arbitrary number of gravitons into EYM amplitudes with fewer gravitons. Based on this recursive technique we write down the complete expansion of any single trace EYM amplitude in the basis of color-order Yang-Mills amplitude. As a byproduct, an algorithm for constructing a polynomial form of the BCJ numerator for Yang-Mills amplitudes is also outlined in this paper. In addition, by applying BCFW recursion relation we show how to arrive at the same EYM amplitude expansion from the on-shell perspective. And we examine the EYM expansion using KLT relations and show how to evaluate the expansion coefficients efficiently.

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An algebraic approach to the scattering equations

Huang

Rao

Feng

et al. 2015

J. High Energ. Phys.

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Abstract:We employ the so-called companion matrix method from computational algebraic geometry, tailored for zero-dimensional ideals, to study the scattering equations. The method renders the CHY-integrand of scattering amplitudes computable using simple linear algebra and is amenable to an algorithmic approach. Certain identities in the amplitudes as well as rationality of the final integrand become immediate in this formalism.

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Rijun Huang

Gauge amplitude identities by on-shell recursion relation in S-matrix program

Expansion of Einstein-Yang-Mills amplitude

An algebraic approach to the scattering equations

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