Showing papers by "Kirill Zainoulline published in 2016"
TL;DR: In this paper, the authors generalize the coproduct structure on nil Hecke rings introduced and studied by Kostant and Kumar to the context of an arbitrary algebraic oriented cohomology theory and its associated formal group law.
Abstract: In the present paper, we generalize the coproduct structure on nil Hecke rings introduced and studied by Kostant and Kumar to the context of an arbitrary algebraic oriented cohomology theory and its associated formal group law. We then construct an algebraic model of the T-equivariant oriented cohomology of the variety of complete flags.
32 citations
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TL;DR: In this article, the Grothendieck ring was presented in terms of generators and relations in the case of Dynkin types of the field, and various groups of semi-decomposable cohomological invariants of degree 3 were derived.
Abstract: Let $G$ be a split semisimple linear algebraic group over a field and let $X$ be a generic twisted flag variety of $G$. Extending the Hilbert basis techniques to Laurent polynomials over integers we give an explicit presentation of the Grothendieck ring $K_0(X)$ in terms of generators and relations in the case $G=G^{sc}/\mu_2$ is of Dynkin type ${\rm A}$ or ${\rm C}$ (here $G^{sc}$ is the simply-connected cover of $G$); we compute various groups of (indecomposable, semi-decomposable) cohomological invariants of degree 3, hence, generalizing and extending previous results in this direction.
5 citations
TL;DR: In this article, the authors introduce and study various categories of (equivariant) motives of (versal) flag varieties and relate these categories with certain categories of parabolic (Demazure) modules.
Abstract: We introduce and study various categories of (equivariant) motives of (versal) flag varieties. We relate these categories with certain categories of parabolic (Demazure) modules. We show that the motivic decomposition type of a versal flag variety depends on the direct sum decomposition type of the parabolic module. To do this we use localization techniques of Kostant-Kumar in the context of generalized oriented cohomology as well as the Rost nilpotence principle for algebraic cobordism and its generic version. As an application, we obtain new proofs and examples of indecomposable Chow motives of versal flag varieties.
4 citations
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TL;DR: In this paper, the authors studied the equivariant oriented cohomology ring of partial flag varieties using the moment map approach, and gave a new interpretation of Deodhar's construction of the parabolic Kazhdan-Lusztig basis.
Abstract: We study the equivariant oriented cohomology ring $h_T(G/P)$ of partial flag varieties using the moment map approach. We define the right Hecke action on this cohomology ring, and then prove that the respective Bott-Samelson classes in $h_{T}(G/P)$ can be obtained by applying this action to the fundamental class of the identity point, hence generalizing previously known results by Brion, Knutson, Peterson, Tymoczko and others.
We then focus on the equivariant oriented cohomology theory corresponding to the 2-parameter Todd genus. We give a new interpretation of Deodhar's construction of the parabolic Kazhdan-Lusztig basis. Based on it, we define the parabolic Kazhdan-Lusztig (KL) Schubert classes independently of a reduced word. We make a positivity conjecture, and a conjecture about the relationship of such classes with smoothness of Schubert varieties. We then prove several special cases.
4 citations
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TL;DR: In this paper, the authors introduce a language relating various motivic categories of $G$-varieties and categories of certain $D_G$modules, where G$ is a semisimple linear algebraic group over a field.
Abstract: The purpose of the present notes is to introduce a language relating various motivic categories of $G$-varieties ($G$ is a semisimple linear algebraic group over a field) and categories of certain $D_G$-modules, where $D_G$ is the Hecke-type ring associated to $G$.
3 citations