Pl\"ucker environments, wiring and tiling diagrams, and weakly separated set-systems

Abstract

For the ordered set [n] of n elements, we consider the class n of bases B of tropical Pl\"ucker functions on 2[n] such that B can be obtained by a series of mutations (flips) from the basis formed by the intervals in [n]. We show that these bases are representable by special wiring diagrams and by certain arrangements generalizing rhombus tilings on the n-zonogon. Based on the generalized tiling representation, we then prove that each weakly separated set-system in 2[n] having maximum possible size belongs to n, thus answering affirmatively a conjecture due to Leclerc and Zelevinsky. We also prove an analogous result for a hyper-simplex nm=\S⊂eq[n] |S|=m\.