Rodina,Hidden zeros are equivalent to enhanced ultraviolet scaling and lead to unique amplitudes in Tr(ϕ 3) theory,Phys

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• Universal Interpretation of Hidden Zero and $2$-Split of Tree-Level Amplitudes Using Feynman Diagrams, Part $\mathbf{I}$: ${\rm Tr}(\phi^3)$, NLSM and YM hep-th · 2026-04-26 · unverdicted · none · ref 12

  A universal diagrammatic interpretation unifies hidden zeros (from massless on-shell conditions) and 2-splits (from double-line separation) in Tr(φ³), NLSM, and YM tree amplitudes using extended shuffle factorization along specific lines.

• Towards New Hidden Zero and $2$-Split of Loop-Level Feynman Integrands in ${\rm Tr}(\phi^3)$ Model hep-th · 2026-04-15 · unverdicted · none · ref 2

  Loop-level hidden zeros and 2-split structures are found in Tr(φ³) Feynman integrands with simple kinematic conditions, generalizing the tree-level case to an L-loop integrand expressed as a sum over L+1 terms each with 2-split structure.

• Hidden zeros for higher-derivative YM and GR amplitudes at tree-level hep-th · 2025-10-13 · unverdicted · none · ref 18

  Hidden zeros extend to higher-derivative tree-level gluon and graviton amplitudes, with systematic cancellation of propagator singularities shown via bi-adjoint scalar expansions.

• A new recursion relation for tree-level NLSM amplitudes based on hidden zeros hep-th · 2025-08-18 · unverdicted · none · ref 15

  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.

• Can Locality, Unitarity, and Hidden Zeros Completely Determine Tree-Level Amplitudes? hep-th · 2026-04-08 · unverdicted · none · ref 6

  Locality, unitarity, and hidden zeros determine tree-level YM and NLSM amplitudes by reconstructing their soft theorems.

• $2$-split from Feynman diagrams and Expansions hep-th · 2025-08-29 · unverdicted · none · ref 18

  Proof via Feynman diagrams that tree-level BAS⊕X amplitudes with X=YM,NLSM,GR obey 2-split under kinematic conditions, extended to pure X amplitudes with byproduct universal expansions of X currents into BAS currents.

• Soft theorems of tree-level ${\rm Tr}(\phi^3)$, YM and NLSM amplitudes from $2$-splits hep-th · 2025-05-31 · unverdicted · none · ref 8

  Extends a 2-split factorization approach to reproduce known leading and sub-leading soft theorems for Tr(φ³) and YM single-soft and NLSM double-soft amplitudes while deriving higher-order universal forms and a kinematic relation linking YM gauge invariance to NLSM Adler zero.

• Hidden Zeros and $2$-split via BCFW Recursion Relation hep-th · 2025-04-19 · unverdicted · none · ref 13

  Hidden zeros in NLSM amplitudes are proven via modified BCFW recursion, with 2-split holding only under careful current definition.

• Note on hidden zeros and expansions of tree-level amplitudes hep-th · 2025-02-11 · unverdicted · none · ref 14

  Hidden zeros in tree-level amplitudes of several theories are attributed to zeros of bi-adjoint scalar amplitudes via universal expansions, with a mechanism shown to cancel potential propagator divergences in gravity.