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Autores principales: Xiong, Rui, Zainoulline, Kirill, Zhong, Changlong
Formato: Preprint
Publicado: 2023
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Acceso en línea:https://arxiv.org/abs/2312.03965
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author Xiong, Rui
Zainoulline, Kirill
Zhong, Changlong
author_facet Xiong, Rui
Zainoulline, Kirill
Zhong, Changlong
contents In the present notes, we study a generalization of the Peterson subalgebra to an oriented (generalized) cohomology theory which we call the formal Peterson subalgebra. Observe that by recent results of Zhong the dual of the formal Peterson algebra provides an algebraic model for the oriented cohomology of the affine Grassmannian. Our first result shows that the centre of the formal affine Demazure algebra generates the formal Peterson subalgebra. Our second observation is motivated by the Peterson conjecture. We show that a certain localization of the formal Peterson subalgebra for the extended Dynkin diagram of type $\hat A_1$ provides an algebraic model for `quantum' oriented cohomology of the projective line. Our last result can be viewed as an extension of the previous results on Hopf algebroids of structure algebras of moment graphs to the case of affine root systems. We prove that the dual of the formal Peterson subalgebra (an oriented cohomology of the affine Grassmannian) is the $0$th Hochshild homology of the formal affine Demazure algebra.
format Preprint
id arxiv_https___arxiv_org_abs_2312_03965
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle On the formal Peterson subalgebra and its dual
Xiong, Rui
Zainoulline, Kirill
Zhong, Changlong
Rings and Algebras
14F43, 14M15, 19L41, 55N22, 14N15
In the present notes, we study a generalization of the Peterson subalgebra to an oriented (generalized) cohomology theory which we call the formal Peterson subalgebra. Observe that by recent results of Zhong the dual of the formal Peterson algebra provides an algebraic model for the oriented cohomology of the affine Grassmannian. Our first result shows that the centre of the formal affine Demazure algebra generates the formal Peterson subalgebra. Our second observation is motivated by the Peterson conjecture. We show that a certain localization of the formal Peterson subalgebra for the extended Dynkin diagram of type $\hat A_1$ provides an algebraic model for `quantum' oriented cohomology of the projective line. Our last result can be viewed as an extension of the previous results on Hopf algebroids of structure algebras of moment graphs to the case of affine root systems. We prove that the dual of the formal Peterson subalgebra (an oriented cohomology of the affine Grassmannian) is the $0$th Hochshild homology of the formal affine Demazure algebra.
title On the formal Peterson subalgebra and its dual
topic Rings and Algebras
14F43, 14M15, 19L41, 55N22, 14N15
url https://arxiv.org/abs/2312.03965