Leading singularities and chambers of Correlahedron

In this paper, we explore the Chamber dissection of the loop-geometry of Correlehedron, which encodes the loop integrand of four-point stress-energy correlators in planar $\mathcal{N}=4$ super Yang-Mills. We demonstrate that at four loops, continuing the pattern of lower loops, the integrand of four-point correlation function can be written as a sum over products of chamber-forms and local loop integrands. The chambers and their associated forms are identical to those of three-loops, indicating that the dissection may be complete to all loop orders. Furthermore, this suggests that the leading singularities to all loops are simply linear combinations of these chamber forms. This is especially intriguing at four loops since it contains elliptic functions. Interestingly, each elliptic function appears in a subset of chambers. Our geometric approach allows us to ``diagonalize" the representation, where the local integrals only possess a single leading singularity or elliptic cut. In such a representation, all integrals must evaluate to pure functions, including a single pure elliptic integral. Inspired by this picture, we also present a simplified form of the three-loop correlator in terms of two independent pure functions (weight-$6$ single-valued multiple polylogarithms), which are directly computed from local integrals with unit leading singularities, multiplied by the leading singularities from chamber forms.