Cluster algebras and tilings for the m=4 amplituhedron

Abstract

The amplituhedron An,k,m(Z) is the image of the positive Grassmannian Grk,n≥ 0 under the map Z: Grk,n≥ 0 Grk,k+m induced by a positive linear map Z:Rn Rk+m. Motivated by a question of Hodges, Arkani-Hamed and Trnka introduced the amplituhedron as a geometric object whose tilings conjecturally encode the BCFW recursion for computing scattering amplitudes. More specifically, the expectation was that one can compute scattering amplitudes in N=4 SYM by tiling the m=4 amplituhedron An,k,4(Z) - that is, decomposing the amplituhedron into `tiles' (closures of images of 4k-dimensional cells of Grk,n≥ 0 on which Z is injective) - and summing the `volumes' of the tiles. In this article we prove two major conjectures about the m=4 amplituhedron: i) the BCFW tiling conjecture, which says that any way of iterating the BCFW recurrence gives rise to a tiling of the amplituhedron An,k,4(Z); ii) the cluster adjacency conjecture for BCFW tiles, which says that facets of tiles are cut out by collections of compatible cluster variables for Gr4,n. Moreover, we show that each BCFW tile is the subset of Grk, k+4 where certain cluster variables have particular signs. Along the way, we construct many explicit seeds for Gr4,n comprised of high-degree cluster variables, which may be of independent interest in the study of cluster algebras.

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