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Tree and $1$-loop fundamental BCJ relations from soft theorems

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abstract

We provide a new derivation of the fundamental BCJ relation among double color ordered tree amplitudes of bi-adjoint scalar theory, based on the leading soft theorem for external scalars. Then, we generalize the fundamental BCJ relation to $1$-loop Feynman integrands. We also use the fundamental BCJ relation to understand the Adler's zero for tree amplitudes of non-linear Sigma model and Born-Infeld theories.

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hep-th 2

years

2025 1 2024 1

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UNVERDICTED 2

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A new recursion relation for tree-level NLSM amplitudes based on hidden zeros

hep-th · 2025-08-18 · unverdicted · novelty 6.0

A recursion for NLSM tree amplitudes based on hidden zeros reproduces the Adler zero, generates amplitudes from Tr(φ³) via δ-shift, expands them into bi-adjoint scalars, and claims these plus factorization uniquely determine all tree-level NLSM amplitudes.

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  • A new recursion relation for tree-level NLSM amplitudes based on hidden zeros hep-th · 2025-08-18 · unverdicted · none · ref 39 · internal anchor

    A recursion for NLSM tree amplitudes based on hidden zeros reproduces the Adler zero, generates amplitudes from Tr(φ³) via δ-shift, expands them into bi-adjoint scalars, and claims these plus factorization uniquely determine all tree-level NLSM amplitudes.