Canonical Landau-Ginzburg models for cominuscule homogeneous spaces

Abstract

We present a type-independent Landau-Ginzburg (LG) model (Xcan, Wcan) for any cominuscule homogeneous space X=G/P. We give a fully combinatorial construction for our superpotential Wcan as a sum of n+1 rational functions in the (generalized) Pl\"ucker coordinates on the "Langlands dual" minuscule homogeneous space X=P G. Explicitly, we define the denominators Di* of these rational functions using the combinatorics of order ideals of the corresponding minuscule poset, which can be interpreted as (generalized) Young diagrams, by a process that can be described by "moving boxes" and hence is easily implemented. To construct the corresponding numerators, we define derivations δi1 on C[X] that act by "adding an appropriate box if possible" and then we apply each δi1 to the corresponding Di*. By studying certain Weyl orbits in the fundamental representations of G and exploiting the existence of a certain dense algebraic torus in X, we show that the polynomials Di* coincide with the generalized minors φi* appearing in the cluster structures for homogeneous spaces studied by Gei-Leclerc-Schr\"oer in arXiv:math/0609138. We then define the mirror variety Xcan=X Dac to be the complement of the anticanonical divisor Dac = Σi*\Di*=0\ formed by the Di*. Moreover, we show that the LG models (Xcan,Wcan) are isomorphic to the Lie-theoretic LG-models (XLie,WLie) constructed by Rietsch in arXiv:math/0511124 and our models naturally generalize the type-dependent Pl\"ucker coordinate LG-models previously studied by various authors.

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