Towards a categorification of scattering amplitudes
Abstract
Categorification of scattering amplitudes for planar Feynman diagrams in scalar field theories with a polynomial potential is reported. Amplitudes for cubic theories are directly written down in terms of projectives of hearts of intermediate t-structures restricted to the cluster category of quiver representations, without recourse to geometry. It is shown that for theories with φm+2 potentials those corresponding to m-cluster categories are to be used. The case of generic polynomial potentials is treated and our results suggest the existence of a generalization of higher cluster categories which we call pseudo-periodic categories. An algorithm to obtain the projectives of hearts of intermediate t-structures for these types is presented.
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