Monk's formula: Difference between revisions

In mathematics, Monk's formula, found by (Monk 1959), is an analogue of Pieri's formula that describes the product of a linear Schubert polynomial by a Schubert polynomial. Equivalently, it describes the product of a special Schubert cycle by a Schubert cycle in the cohomology of a flag manifold. Write t_ij for the transposition (i j), and s_i = t_i,i+1. Then 𝔖_sr = x₁ + ⋯ + x_r, and Monk's formula states that for a permutation w,

[math]\displaystyle{ \mathfrak{S}_{s_r} \mathfrak{S}_w = \sum_{{i \leq r \lt j} \atop {\ell(wt_{ij}) = \ell(w)+1}} \mathfrak{S}_{wt_{ij}}, }[/math]

where [math]\displaystyle{ \ell(w) }[/math] is the length of w. The pairs (i, j) appearing in the sum are exactly those such that i ≤ r < j, w_i < w_j, and there is no i < k < j with w_i < w_k < w_j; each wt_ij is a cover of w in Bruhat order.

References

• Monk, D. (1959), "The geometry of flag manifolds", Proceedings of the London Mathematical Society, Third Series 9 (2): 253–286, doi:10.1112/plms/s3-9.2.253, ISSN 0024-6115 

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