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· 2023 · arXiv 2012.00519

2 Pith papers cite this work. Polarity classification is still indexing.

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The bi-adjoint scalar $\ell$-loop planar integrand recursion and graded inverse variables

hep-th · 2025-05-11 · unverdicted · novelty 6.0

A new formalism with graded inverse variables refines the ℓ-loop planar integrand recursion in bi-adjoint scalar theory, allowing graph factors and symmetry factors to be read directly from monomials.

Systematic approach to $\ell$-loop planar integrands from the classical equation of motion

hep-th · 2025-04-22 · unverdicted · novelty 6.0

A recursion formula for ℓ-loop planar integrands in colored QFTs is derived from the classical equation of motion via comb components and loop kernels.

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The bi-adjoint scalar $\ell$-loop planar integrand recursion and graded inverse variables hep-th · 2025-05-11 · unverdicted · none · ref 18
A new formalism with graded inverse variables refines the ℓ-loop planar integrand recursion in bi-adjoint scalar theory, allowing graph factors and symmetry factors to be read directly from monomials.
Systematic approach to $\ell$-loop planar integrands from the classical equation of motion hep-th · 2025-04-22 · unverdicted · none · ref 21
A recursion formula for ℓ-loop planar integrands in colored QFTs is derived from the classical equation of motion via comb components and loop kernels.

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