Double copy for massive quantum particles with spin

representative citing papers

citing papers explorer

Showing 6 of 6 citing papers.

• Tree and $1$-loop fundamental BCJ relations from soft theorems hep-th · 2023-05-08 · unverdicted · none · ref 52

  Derives the fundamental BCJ relation at tree level from soft theorems in bi-adjoint scalar theory, generalizes it to 1-loop integrands, and uses it to explain Adler zeros in other scalar theories.

• Recursive construction for expansions of tree Yang-Mills amplitudes from soft theorem hep-th · 2023-11-06 · unverdicted · none · ref 8

  A recursive construction expands tree YM amplitudes to YMS and BAS amplitudes from soft theorems while preserving gauge invariance at each step.

• New recursive construction for tree NLSM and SG amplitudes, and new understanding of enhanced Adler zero hep-th · 2023-10-24 · unverdicted · none · ref 27

  Recursive construction of off-shell NLSM and SG tree amplitudes from bootstrapped low-point ones via universal soft behaviors, automatically producing enhanced Adler zeros on-shell.

• Note on tree NLSM amplitudes and soft theorems hep-th · 2023-06-16 · unverdicted · none · ref 27

  The paper constructs general tree NLSM amplitudes via an expanded formula enforced by Adler zero universality and derives the corresponding double soft factors.

• Tree level amplitudes from soft theorems hep-th · 2022-12-25 · unverdicted · none · ref 50

  Tree-level amplitudes for Yang-Mills-scalar, pure Yang-Mills, Einstein-Yang-Mills and gravitational theories are reconstructed from soft theorems, universality of soft factors and double copy, with explicit soft factors determined.

• Expanding single trace YMS amplitudes with gauge invariant coefficients hep-th · 2023-06-26 · unverdicted · none · ref 6

  A recursive expansion of single-trace YMS amplitudes is built from soft theorems; the result is gauge invariant, permutation symmetric, and equivalent to the Cheung-Mangan covariant color-kinematic duality construction.