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Standard monomial theory and toric degenerations of Richardson varieties in the Grassmannian

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 Added by Fatemeh Mohammadi
 Publication date 2021
  fields
and research's language is English




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Richardson varieties are obtained as intersections of Schubert and opposite Schubert varieties. We provide a new family of toric degenerations of Richardson varieties inside Grassmannians by studying Grobner degenerations of their corresponding ideals. These degenerations are parametrised by block diagonal matching fields in the sense of Sturmfels-Zelevinsky. We associate a weight vector to each block diagonal matching field and study its corresponding initial ideal. In particular, we characterise when such ideals are toric, hence providing a family of toric degenerations for Richardson varieties. Given a Richardson variety $X_{w}^v$ and a weight vector ${bf w}_ell$ arising from a matching field, we consider two ideals: an ideal $G_{k,n,ell}|_w^v$ obtained by restricting the initial of the Plucker ideal to a smaller polynomial ring, and a toric ideal defined as the kernel of a monomial map $phi_ell|_w^v$. We first characterise the monomial-free ideals of form $G_{k,n,ell}|_w^v$. Then we construct a family of tableaux in bijection with semi-standard Young tableaux which leads to a monomial basis for the corresponding quotient ring. Finally, we prove that when $G_{k,n,ell}|_w^v$ is monomial-free and the initial ideal in$_{{bf w}_ell}(I(X_w^v))$ is quadratically generated, then all three ideals in$_{{bf w}_ell}(I(X_w^v))$, $G_{k,n,ell}|_w^v$ and ker$(phi_ell|_w^v)$ coincide, and provide a toric degeneration of $X_w^v$.



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We study standard monomial bases for Richardson varieties inside the flag variety. In general, writing down a standard monomial basis for a Richardson variety can be challenging, as it involves computing so-called defining chains or key tableaux. However, for a certain family of Richardson varieties, indexed by compatible permutations, we provide a very direct and straightforward combinatorial rule for writing down a standard monomial basis. We apply this result to the study of toric degenerations of Richardson varieties. In particular, we provide a new family of toric degenerations of Richardson varieties inside flag varieties.
We study Grobner degenerations of Schubert varieties inside flag varieties. We consider toric degenerations of flag varieties induced by matching fields and semi-standard Young tableaux. We describe an analogue of matching field ideals for Schubert varieties inside the flag variety and give a complete characterization of toric ideals among them. We use a combinatorial approach to standard monomial theory to show that block diagonal matching fields give rise to toric degenerations. Our methods and results use the combinatorics of permutations associated to Schubert varieties, matching fields and their corresponding tableaux.
In the present paper, we prove that the toric ideals of certain $s$-block diagonal matching fields have quadratic Grobner bases. Thus, in particular, those are quadratically generated. By using this result, we provide a new family of toric degenerations of Grassmannians.
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