Hidden simplicity in AdS spinning Mellin amplitudes via scaffolding

Abstract

We uncover surprising hidden simplicity in Mellin amplitudes for tree-level AdS holographic correlators for spinning operators, such as AdS "gluons" and "gravitons" (spin 1 and 2). We define Mellin amplitudes with n spinning operators via the so-called "scaffolding" of 2n-scalar ones with specific projection operators for each spin state, which are rational functions of Mellin variables of 2n scalars generalizing flat-space scaffolding amplitudes. We classify possible three-point structures with spin 1 and 2 which take the same form as massive three-point amplitudes in flat space, and match with special solutions such as those extracted from 6-scalar ones in AdS5× S3 or AdS5× S5. Focusing on AdS5 gluons, we directly bootstrap spinning amplitudes in scaffolding form up to n=6 gluons (which amounts to 2n=12 scalars) using factorizations, multi-linearity and flat-space limit. The results take a remarkably simple form in analogy with flat-space amplitudes, which can be constructed from familiar 3- and 4-vertices as well as propagators of massive spin-1 particles. Surprisingly, we find that vertices with any descendant levels are proportional to the primary ones with nice combinatorial coefficients, which makes manifest the correct flat-space limit in the simplest possible way.