Multivariate hypergeometric solutions of cosmological (dS) correlators by $\text{d} \log$-form differential equations

In this paper, we give the analytic expression for homogeneous part of solutions of arbitrary tree-level cosmological correlators, including massive propagators and time-derivative interactions cases. The solutions are given in the form of multivariate hypergeometric functions. It is achieved by two step. Firstly, we indicate the factorization of the homogeneous part of solutions, i.e., the homogeneous part of solutions of multiple vertices is the product of the solutions of the single vertex. Secondly, we give the solution to the $\text{d} \log$-form differential equations of arbitrary single vertex integral family. We also show how to determine the boundary conditions for the differential equations. There are two techniques we developed for the computation. Firstly, we analytically solve $\text{d} \log$-form differential equations via power series expansion. Secondly, we handle degenerate multivariate poles in power series expansion of differential equations by blow-up. They could also be useful in the evaluation of multi-loop Feynman integrals in flat spacetime.
Comment: 33 pages, 1 figure