The Geometry of BCFW for ABJM Loop Integrands
Abstract
In this paper we investigate the loop-level geometry of ABJM theory from the perspective of lightcone geometries in dual space. This geometry admits a natural fibration, where one of the loop variables can be naturally interpreted as living in a fiber for each fixed point of a lower-loop geometry. When varying the latter, this leads us to the definition of L-loop half-chambers, defined such that `half' of the (L+1)-loop fiber remains unchanged. We provide a full classification of these half-chambers, and demonstrate a surprising bijection between n-point L-loop half-chambers and L-loop Feynman diagrams for a cubic scalar theory with n/2 particles. Consequently, the sum over L-loop half-chambers that computes the n-point ABJM amplitude is in direct correspondence with the sum over L-loop Feynman diagrams that computes the (n/2)-point amplitude of Tr(φ3) theory. These Feynman diagrams are also realised geometrically in the structure of the loop fibers. Furthermore, we argue that the half-chamber expansion is equivalent to the loop-level BCFW recursion for ABJM, which arises naturally from our geometric construction. Finally, we will illustrate how L-loop chambers emerge as the intersection of two L-loop half-chambers, and we provide concrete examples of this construction.
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