Birational sequences for the Grassmannian Gr(3,n)

Abstract

Following the ideas of Bossinger and Fang, Fourier, and Littelman, we study iterated sequences for the Grassmannian Gr (3, n) as a special class of birational sequences. For each iterated sequence S, there is a weighting matrix MS corresponding to a valuation on the rational coordinate ring and we show that the initial form of a Pl\"ucker relation inMS (RI,J ) is binomial. We show that, in some cases, the cones CS in the tropical Grassmannian that satisfy inMS (I3,n) = inCS (I3,n) only depend on the first two indices used in each iteration. In the case of Gr (3, 6), these cones are obtained computationally and are classified up to automorphism induced by the symmetric group S6.

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