Components of Springer fibers associated to closed orbits for the symmetric pairs (Sp(2n),GL(n)) and (O(n),O(p)×O(q)) I

Pattern avoidance and smoothness of closures for orbits of a symmetric subgroup in the flag variety

William M. McGovern
Peter E. Trapa

April 2015

We give a pattern avoidance criterion to classify the orbits of Sp(p,C)×Sp(q,C) (resp. GL(n,C)) on t...

ORBITS OF A FIXED-POINT SUBGROUP OF THE SYMPLECTIC GROUP ON PARTIAL FLAG VARIETIES OF TYPE A

Jeffrey Cai
Ridge High

October 2015

Abstract. In this paper we compute the orbits of the symplectic group Sp2n on partial flag varieties...

CLOSED ORBITS ON PARTIAL FLAG VARIETIES AND DOUBLE FLAG VARIETY OF FINITE TYPE

Kondo, Kensuke
Nishiyama, Kyo
Ochiai, Hiroyuki
Taniguchi, Kenji
近藤, 健介
西山, 亨
落合, 啓之
谷口, 健二

May 2014

Let G be a connected reductive algebraic group over C. We denote by K = (G^θ)_0 the identity compone...

Components of Springer fibers associated to closed orbits for the symmetric pairs (Sp(2n),GL(n)) and (O(n),O(p)×O(q)) I

Barchini, L.
Zierau, R.

November 2011

AbstractLet (G,K) be either (Sp(2n),GL(n)) or (O(n),O(p)×O(q)), p+q=n. An explicit geometric descrip...

Components of Springer fibers associated to closed orbits for the symmetric pairs (Sp(2n),GL(n)) and (O(n),O(p)×O(q)) II

Barchini, L.
Graham, William
Zierau, R.

November 2011

AbstractLet (G,K) be either (Sp(2n),GL(n)) or (O(n),O(p)×O(q)), p+q=n. This is the second of two art...

Smooth components of Springer fibers

Graham, William
Zierau, Roger

January 2011

This article studies components of Springer fibers for gl(n) that are associated to closed orbits of...

Certain components of Springer fibers and associated cycles for discrete series representations of SU(p, q), Representation Theory 12 (2008), 403–434, with appendix by P. Trapa

L. Barchini
R. Zierau

February 2015

Let GR be a real form of a connected complex simple Lie group G and let X be the flag variety of G. ...

Cycle spaces of infinite dimensional flag domains

Wolf, JA

December 2016

Let G be a complex simple direct limit group, specifically SL(∞; C) , SO(∞; C) or Sp(∞; C). Let F be...

On intersections of orbital varieties and components of Springer fiber

Melnikov, A.
Pagnon, N.G.J.

April 2006

AbstractWe consider Springer fibers and orbital varieties for GLn. We show that the irreducible comp...

Springer Fibers for the Minimal and the Minimal Special Nilpotent Orbits

Kim, Dongkwan

September 2020

Abstract We describe Springer fibers corresponding to the minimal and minimal special...

Components of Springer fibers associated to closed orbits for the symmetric pairs (Sp(2n),GL(n)) and (O(n),O(p)×O(q)) II

Barchini, L.
Graham, William
Zierau, R.

November 2011

AbstractLet (G,K) be either (Sp(2n),GL(n)) or (O(n),O(p)×O(q)), p+q=n. This is the second of two art...

On the Associated Cycles of Discrete Series Representations

Božičević, Mladen

October 1998

AbstractLet (G,K) be a classical symmetric pair defined by the involution θ onG. Let (g,k) be the co...

Leading terms cycles of Harish-Chandra modules and partial orders on irreducible components of the Springer fiber

Peter E. Trapa

January 2015

Abstract. We use the geometry of characteristic cycles of Harish-Chandra modules for a real semisimp...

Combinatorics and Representation Theory of Rank Varieties, Springer Fibers, and Hyperplane Arrangements

Griffin, Sean

January 2020

Thesis (Ph.D.)--University of Washington, 2020This thesis is dedicated to applications of symmetric ...

INTEGRALS OVER COMPONENTS OF THE SPRINGER FIBER FOR sl(n,C)

Peter E. Trapa

December 2014

The main result in [BaZ, Section 6] is an algorithm to compute the cohomology of a certain class of ...

Pattern avoidance and smoothness of closures for orbits of a symmetric subgroup in the flag variety

William M. McGovern
Peter E. Trapa

April 2015

We give a pattern avoidance criterion to classify the orbits of Sp(p,C)×Sp(q,C) (resp. GL(n,C)) on t...

ORBITS OF A FIXED-POINT SUBGROUP OF THE SYMPLECTIC GROUP ON PARTIAL FLAG VARIETIES OF TYPE A

Jeffrey Cai
Ridge High

October 2015

Abstract. In this paper we compute the orbits of the symplectic group Sp2n on partial flag varieties...

CLOSED ORBITS ON PARTIAL FLAG VARIETIES AND DOUBLE FLAG VARIETY OF FINITE TYPE

Kondo, Kensuke
Nishiyama, Kyo
Ochiai, Hiroyuki
Taniguchi, Kenji
近藤, 健介
西山, 亨
落合, 啓之
谷口, 健二

May 2014

Let G be a connected reductive algebraic group over C. We denote by K = (G^θ)_0 the identity compone...

Components of Springer fibers associated to closed orbits for the symmetric pairs (Sp(2n),GL(n)) and (O(n),O(p)×O(q)) I

Barchini, L.
Zierau, R.

November 2011

AbstractLet (G,K) be either (Sp(2n),GL(n)) or (O(n),O(p)×O(q)), p+q=n. An explicit geometric descrip...

Components of Springer fibers associated to closed orbits for the symmetric pairs (Sp(2n),GL(n)) and (O(n),O(p)×O(q)) II

Barchini, L.
Graham, William
Zierau, R.

November 2011

AbstractLet (G,K) be either (Sp(2n),GL(n)) or (O(n),O(p)×O(q)), p+q=n. This is the second of two art...

Smooth components of Springer fibers

Graham, William
Zierau, Roger

January 2011

This article studies components of Springer fibers for gl(n) that are associated to closed orbits of...

Certain components of Springer fibers and associated cycles for discrete series representations of SU(p, q), Representation Theory 12 (2008), 403–434, with appendix by P. Trapa

L. Barchini
R. Zierau

February 2015

Let GR be a real form of a connected complex simple Lie group G and let X be the flag variety of G. ...

Cycle spaces of infinite dimensional flag domains

Wolf, JA

December 2016

Let G be a complex simple direct limit group, specifically SL(∞; C) , SO(∞; C) or Sp(∞; C). Let F be...

On intersections of orbital varieties and components of Springer fiber

Melnikov, A.
Pagnon, N.G.J.

April 2006

AbstractWe consider Springer fibers and orbital varieties for GLn. We show that the irreducible comp...

Springer Fibers for the Minimal and the Minimal Special Nilpotent Orbits

Kim, Dongkwan

September 2020

Abstract We describe Springer fibers corresponding to the minimal and minimal special...

Components of Springer fibers associated to closed orbits for the symmetric pairs (Sp(2n),GL(n)) and (O(n),O(p)×O(q)) II

Barchini, L.
Graham, William
Zierau, R.

November 2011

AbstractLet (G,K) be either (Sp(2n),GL(n)) or (O(n),O(p)×O(q)), p+q=n. This is the second of two art...

On the Associated Cycles of Discrete Series Representations

Božičević, Mladen

October 1998

AbstractLet (G,K) be a classical symmetric pair defined by the involution θ onG. Let (g,k) be the co...

Leading terms cycles of Harish-Chandra modules and partial orders on irreducible components of the Springer fiber

Peter E. Trapa

January 2015

Abstract. We use the geometry of characteristic cycles of Harish-Chandra modules for a real semisimp...

Combinatorics and Representation Theory of Rank Varieties, Springer Fibers, and Hyperplane Arrangements

Griffin, Sean

January 2020

Thesis (Ph.D.)--University of Washington, 2020This thesis is dedicated to applications of symmetric ...

INTEGRALS OVER COMPONENTS OF THE SPRINGER FIBER FOR sl(n,C)

Peter E. Trapa

December 2014

The main result in [BaZ, Section 6] is an algorithm to compute the cohomology of a certain class of ...

Pattern avoidance and smoothness of closures for orbits of a symmetric subgroup in the flag variety

William M. McGovern
Peter E. Trapa

April 2015

We give a pattern avoidance criterion to classify the orbits of Sp(p,C)×Sp(q,C) (resp. GL(n,C)) on t...

ORBITS OF A FIXED-POINT SUBGROUP OF THE SYMPLECTIC GROUP ON PARTIAL FLAG VARIETIES OF TYPE A

Jeffrey Cai
Ridge High

October 2015

Abstract. In this paper we compute the orbits of the symplectic group Sp2n on partial flag varieties...

CLOSED ORBITS ON PARTIAL FLAG VARIETIES AND DOUBLE FLAG VARIETY OF FINITE TYPE

Kondo, Kensuke
Nishiyama, Kyo
Ochiai, Hiroyuki
Taniguchi, Kenji
近藤, 健介
西山, 亨
落合, 啓之
谷口, 健二

May 2014

Let G be a connected reductive algebraic group over C. We denote by K = (G^θ)_0 the identity compone...

Components of Springer fibers associated to closed orbits for the symmetric pairs (Sp(2n),GL(n)) and (O(n),O(p)×O(q)) I

Abstract

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Components of Springer fibers associated to closed orbits for the symmetric pairs (Sp(2n),GL(n)) and (O(n),O(p)×O(q)) I

Abstract

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