Prefix-bounded matrices

By unifying various earlier extensions of alternating sign matrices (ASMs), we introduce the notion of prefix-bounded matrices (PBMs). It is shown that the convex hull of these matrices forms the intersection of two special (called laminar) g-polymatroids. This implies (in a more general form) that the linear inequality system given by Behrend and Knight and by Striker for describing the polytope of alternating sign matrices is TDI, confirming a recent conjecture of Edmonds. By relying on the polymatroidal approach, we derive a characterization for the existence of prefix-bounded matrices meeting upper and lower bound requirements on their entries. Furthermore, we point out that the constraint matrix of the linear system describing the convex hull of PBMs (in particular, ASMs) is a network matrix. This implies that (a) standard network flow techniques can be used to manage algorithmically optimization and structural results on PBMs obtained via g-polymatroids, (b) the linear system is actually box-TDI, and (c) the convex hull of PBMs has (a sharpened form of) the integer Carath\'eodory property, in particular, the integer decomposition property. This latter feature makes it possible to confirm (in an extended form) an elegant conjecture of Brualdi and Dahl on the decomposability of a so-called $k$-regular alternating sign matrix as the sum of $k$ pattern-disjoint ASMs.