Constructing Maximal Bumpless Pipedreams for Double Grothendieck Polynomials

Pipedreams and bumpless pipedreams are two combinatorial models that compute double Grothendieck polynomials. While studying matrix Schubert varieties, Pechenik, Speyer, and Weigandt defined a permutation statistic$\mathsf{rajcode}(\cdot)$ that captures the leading monomial of the top-degree components of a Grothendieck polynomial. Combinatorially, their result implies that there exists a unique pipedream (or bumpless pipedream) with row weight $\mathsf{rajcode}(w)$ and column weight $\mathsf{rajcode}(w^{-1})$. A construction of such a pipedream was subsequently given by Chou and Yu. In this paper, we resolve the bumpless pipedream version of this problem by providing an explicit algorithm.