$P$-alcoves and nonemptiness of affine Deligne-Lusztig varieties

Görtz, Ulrich; He, Xuhua; Nie, Sian

doi:10.24033/asens.2254

Cited by 39 publications

(56 citation statements)

References 8 publications

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“…Let P be a semistandard parabolic subgroup of G. The notion of P-alcove elements (inW ) was introduced by Görtz, Haines, Kottwitz, and Reuman in [5] and generalized in [4] for non-split groups. Roughly speaking, w is a P-alcove element if the finite part of w lies in the finite Weyl group of P, and w sends the fundamental alcove to a certain region of the apartment.…”

Section: Application To Affine Deligne-lusztig Varietiesmentioning

confidence: 99%

$$P$$ P -alcoves, parabolic subalgebras and cocenters of affine Hecke algebras

Nie

2015

Sel. Math. New Ser.

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The cocenter of an affine Hecke algebra plays an important role in the study of representations of the affine Hecke algebra and the geometry of affine DeligneLusztig varieties (see for example, He Ciubotaru and He in Cocenter and representations of affine Hecke algebras, 2014). In this paper, we give a Bernstein-Lusztig type presentation of the cocenter. We also obtain a comparison theorem between the class polynomials of the affine Hecke algebra and those of its parabolic subalgebras, which is an algebraic analog of the Hodge-Newton decomposition theorem for affine Deligne-Lusztig varieties. As a consequence, we present a new proof of the emptiness pattern of affine Deligne-Lusztig varieties (Görtz et al.

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Section: Application To Affine Deligne-lusztig Varietiesmentioning

confidence: 99%

$$P$$ P -alcoves, parabolic subalgebras and cocenters of affine Hecke algebras

Nie

2015

Sel. Math. New Ser.

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“…The theorem was first established in [GHKR,Theorem 1.1.5] for split groups, where part (a) is referred to as a version of Hodge-Newton decomposition relating affine Deligne-Lusztig varieties associated tow for G and those for L. Its generalization for quasi-split groups was obtained in [GHN,Theorem 3.3.1]. In this paper, we adopt the (generalized) notion of P -alcove element introduced in loc.cit, but in a slight different form.…”

Section: Introductionmentioning

confidence: 99%

“…Thanks to [GHN,Lemma 4.4.2], w is either a v ′ -alcove element or a v ′′ -alcove element as desired.…”

Section: Let J ⊂ Wmentioning

confidence: 99%

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Fundamental elements of an affine Weyl group

Nie

2014

Math. Ann.

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Abstract. Fundamental elements are certain special elements of affine Weyl groups introduced by Görtz, Haines, Kottwitz and Reuman. They play an important role in the study of affine Deligne-Lusztig varieties. In this paper, we obtain characterizations of the fundamental elements and their natural generalizations. We also derive an inverse to a version of "Newton-Hodge decomposition" in affine flag varieties. As an application, we obtain a group-theoretic generalization of Oort's results on minimal p-divisible groups, and we show that, in certain good reduction reduction of PEL Shimura datum, each Newton stratum contains a minimal Ekedahl-Oort stratum. This generalizes a result of Viehmann and Wedhorn.

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“…If P J is an Iwahori subgroup and b is basic, a conjecture on the non-emptiness pattern (for split groups) is given by Görtz, Haines, Kottwitz, and Reuman in [3] in terms of P -alcoves in [3] and the generalization of this conjecture to any tamely ramified groups is proved in [4]. The non-emptiness pattern for basic b and other parahoric subgroups can then be deduced from Iwahori case easily.…”

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confidence: 97%

Kottwitz-Rapoport conjecture on unions of affine Deligne-Lusztig varieties

He¹

2016

Ann. Sci. École Norm. Sup.

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Abstract. In this paper, we prove a conjecture of Kottwitz and Rapoport on a union of (generalized) affine Deligne-Lusztig varieties X(µ, b) J for any tamely ramified group G and its parahoric subgroup P J . We show that X(µ, b) J = ∅ if and only if the grouptheoretic version of Mazur's inequality is satisfied. In the process, we obtain a generalization of Grothendieck's conjecture on the closure relation of σ-conjugacy classes of a twisted loop group.Dans cet article nous prouvons une conjecture de Kottwitz et Rapoport sur l'union de variétés de Deligne-Lusztig affines (généralisées) X(µ, b) J pour G un groupe modérément ramifié et P J son sousgroupe parahorique. Nous montront que X(µ, b) J est non vide si et seulement si la version de l'inégalité de Mazur pour les groupes est satisfaite. Au cours de la preuve, nous obtenons une généralisation de la conjecture de Grothendieck sur les inclusions des adhérences de classes de σ-conjugaison d'un groupe de lacets tordu.

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$P$-alcoves and nonemptiness of affine Deligne-Lusztig varieties

Cited by 39 publications

References 8 publications

$$P$$ P -alcoves, parabolic subalgebras and cocenters of affine Hecke algebras

$$P$$ P -alcoves, parabolic subalgebras and cocenters of affine Hecke algebras

Fundamental elements of an affine Weyl group

Kottwitz-Rapoport conjecture on unions of affine Deligne-Lusztig varieties

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