Degree of the Grassmannian as an affine variety

Abstract

The degree of the Grassmannian with respect to the Pl\"ucker embedding is well-known. However, the Pl\"ucker embedding, while ubiquitous in pure mathematics, is almost never used in applied mathematics. In applied mathematics, the Grassmannian is usually embedded as projection matrices Gr(k,Rn) \P ∈ Rn × n : PT = P = P2,\; tr(P) = k\ or as involution matrices Gr(k,Rn) \X ∈ Rn × n : XT = X,\; X2 = I,\; tr(X)=2k - n\. We will determine an explicit expression for the degree of the Grassmannian with respect to these embeddings. In so doing, we resolved a conjecture of Devriendt, Friedman, Reinke, and Sturmfels about the degree of Gr(2, Rn) and in fact generalized it to Gr(k, Rn). We also proved a set theoretic variant of another conjecture of theirs about the limit of Gr(k,Rn) in the sense of Gr\"obner degneration.

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