Your search keyword '"Elizabeth Milićević"' showing total 13 results

1. Generic Newton points and the Newton poset in Iwahori-double cosets

Author

Elizabeth Milićević and Eva Viehmann

Subjects

0G25, 11G25, 14L05, 20F55, affine Deligne-Lusztig variety, Newton strata, affine flag variety, Mathematics, QA1-939

Abstract

We consider the Newton stratification on Iwahori-double cosets in the loop group of a reductive group. We describe a group-theoretic condition on the generic Newton point, called cordiality, under which the Newton poset (that is, the index set for non-empty Newton strata) is saturated and Grothendieck’s conjecture on closures of the Newton strata holds. Finally, we give several large classes of Iwahori-double cosets for which this condition is satisfied by studying certain paths in the associated quantum Bruhat graph.

Published

2020

2. Affine Deligne–Lusztig varieties and folded galleries governed by chimneys

Author

Elizabeth Milićević, Petra Schwer, and Anne Thomas

Subjects

Algebra and Number Theory, Geometry and Topology

Published

2023

3. An Affine Approach to Peterson Comparison

Author

Linda Chen, Elizabeth Milićević, and Jennifer Morse

Subjects

0209 industrial biotechnology, Pure mathematics, General Mathematics, Duality (mathematics), 14N15, 14N35, 14M15, 05E14, 02 engineering and technology, Homology (mathematics), Mathematics::Algebraic Topology, 01 natural sciences, Mathematics - Algebraic Geometry, 020901 industrial engineering & automation, Mathematics::K-Theory and Homology, Grassmannian, FOS: Mathematics, Mathematics - Combinatorics, 0101 mathematics, Mathematics::Representation Theory, Algebraic Geometry (math.AG), Mathematics::Symplectic Geometry, Mathematics, Mathematics::Combinatorics, 010102 general mathematics, Affine Grassmannian (manifold), 16. Peace & justice, Combinatorics (math.CO), Affine transformation, Isomorphism, Flag (geometry), Quantum cohomology

Abstract

The Peterson comparison formula proved by Woodward relates the three-pointed Gromov-Witten invariants for the quantum cohomology of partial flag varieties to those for the complete flag. Another such comparison can be obtained by composing a combinatorial version of the Peterson isomorphism with a result of Lapointe and Morse relating quantum Littlewood-Richardson coefficients for the Grassmannian to k-Schur analogs in the homology of the affine Grassmannian obtained by adding rim hooks. We show that these comparisons on quantum cohomology are equivalent, up to Postnikov's strange duality isomorphism., 28 pages; added several references, final version to appear in Algebr. Represent. Theory

Published

2021

4. A Gallery Model for Affine Flag Varieties via Chimney Retractions

Author

Elizabeth Milićević, Yusra Naqvi, Petra Schwer, and Anne Thomas

Subjects

Mathematics::Group Theory, Algebra and Number Theory, FOS: Mathematics, Mathematics::General Topology, Mathematics - Combinatorics, Combinatorics (math.CO), Group Theory (math.GR), Geometry and Topology, Representation Theory (math.RT), Mathematics::Representation Theory, Mathematics - Group Theory, Mathematics - Representation Theory, 20E42, 05E10, 05E45, 14M15, 20G25, 51E24

Abstract

This paper provides a unified combinatorial framework to study orbits in certain affine flag varieties via the associated Bruhat-Tits buildings. We first formulate, for arbitrary affine buildings, the notion of a chimney retraction. This simultaneously generalizes the two well-known notions of retractions in affine buildings: retractions from chambers at infinity and retractions from alcoves. We then present a recursive formula for computing the images of certain minimal galleries in the building under chimney retractions, using purely combinatorial tools associated to the underlying affine Weyl group. Finally, for Bruhat-Tits buildings in the function field case, we relate these retractions and their effect on minimal galleries to double coset intersections in the corresponding affine flag variety., 40 pages, 7 figures best viewed in color; v3: results on double cosets restricted to function fields; final version to appear in Transform. Groups

Published

2022

5. Maximal Newton points and the quantum Bruhat graph

Author

Elizabeth Milićević

Subjects

Weyl group, Pure mathematics, General Mathematics, 010102 general mathematics, Algebraic geometry, 20G25, 11G25 (Primary), 20F55, 14N15, 06A11 (Secondary), 01 natural sciences, Bruhat order, Graph, Mathematics - Algebraic Geometry, symbols.namesake, 0103 physical sciences, FOS: Mathematics, symbols, Mathematics - Combinatorics, Combinatorics (math.CO), 010307 mathematical physics, Affine transformation, 0101 mathematics, Partially ordered set, Mathematics::Representation Theory, Algebraic Geometry (math.AG), Quantum, Quantum cohomology, Mathematics

Abstract

We discuss a surprising relationship between the partially ordered set of Newton points associated to an affine Schubert cell and the quantum cohomology of the complex flag variety. The main theorem provides a combinatorial formula for the unique maximum element in this poset in terms of paths in the quantum Bruhat graph, whose vertices are indexed by elements in the finite Weyl group. Key to establishing this connection is the fact that paths in the quantum Bruhat graph encode saturated chains in the strong Bruhat order on the affine Weyl group. This correspondence is also fundamental in the work of Lam and Shimozono establishing Peterson's isomorphism between the quantum cohomology of the finite flag variety and the homology of the affine Grassmannian. One important geometric application of the present work is an inequality which provides a necessary condition for non-emptiness of certain affine Deligne-Lusztig varieties in the affine flag variety., 39 pages, 4 figures best viewed in color; final version to appear in Michigan Math. J

Published

2021

6. Generic Newton points and the Newton poset in Iwahori-double cosets

Author

Elizabeth Milićević and Eva Viehmann

Subjects

Statistics and Probability, Pure mathematics, Astrophysics::High Energy Astrophysical Phenomena, Algebraic geometry, 01 natural sciences, Stratification (mathematics), Theoretical Computer Science, Mathematics - Algebraic Geometry, 20G25, 11G25 (Primary), 14L05, 20F55 (Secondary), Loop group, 0103 physical sciences, FOS: Mathematics, Mathematics - Combinatorics, Discrete Mathematics and Combinatorics, 0101 mathematics, Mathematics::Representation Theory, Algebraic Geometry (math.AG), Mathematical Physics, Mathematics, Algebra and Number Theory, Conjecture, 010102 general mathematics, Reductive group, 16. Peace & justice, ddc, Computational Mathematics, Index set, Coset, 010307 mathematical physics, Geometry and Topology, Combinatorics (math.CO), Partially ordered set, Analysis

Abstract

We consider the Newton stratification on Iwahori double cosets in the loop group of a reductive group. We describe a group-theoretic condition on the generic Newton point, called cordiality, under which the Newton poset (i.e. the index set for non-empty Newton strata) is saturated and Grothendieck's conjecture on closures of the Newton strata holds. Finally, we give several large classes of Iwahori double cosets for which this condition is satisfied by studying certain paths in the associated quantum Bruhat graph., Comment: 17 pages, 1 figure; expanded introduction, generalized main theorem, changed section numbers; final version to appear in Forum of Mathematics, Sigma v3: no mathematical changes, additional funding accredited

Published

2019

7. Dimensions of Affine Deligne–Lusztig Varieties: A New Approach via Labeled Folded Alcove Walks and Root Operators

Author

Petra Schwer, Anne Thomas, and Elizabeth Milićević

Subjects

Pure mathematics, General Mathematics, Field (mathematics), Group Theory (math.GR), 01 natural sciences, Representation theory, Algebraic closure, Mathematics - Algebraic Geometry, symbols.namesake, FOS: Mathematics, Mathematics - Combinatorics, Representation Theory (math.RT), 0101 mathematics, Mathematics::Representation Theory, Algebraic Geometry (math.AG), Mathematics, Weyl group, Conjecture, Applied Mathematics, 010102 general mathematics, Reductive group, Geometric group theory, symbols, Combinatorics (math.CO), Affine transformation, Mathematics - Group Theory, Mathematics - Representation Theory

Abstract

Let G be a reductive group over the field F=k((t)), where k is an algebraic closure of a finite field, and let W be the (extended) affine Weyl group of G. The associated affine Deligne-Lusztig varieties $X_x(b)$, which are indexed by elements b in G(F) and x in W, were introduced by Rapoport. Basic questions about the varieties $X_x(b)$ which have remained largely open include when they are nonempty, and if nonempty, their dimension. We use techniques inspired by geometric group theory and representation theory to address these questions in the case that b is a pure translation, and so prove much of a sharpened version of Conjecture 9.5.1 of G\"ortz, Haines, Kottwitz, and Reuman. Our approach is constructive and type-free, sheds new light on the reasons for existing results in the case that b is basic, and reveals new patterns. Since we work only in the standard apartment of the building for G(F), our results also hold in the p-adic context, where we formulate a definition of the dimension of a p-adic Deligne-Lusztig set. We present two immediate consequences of our main results, to class polynomials of affine Hecke algebras and to affine reflection length., Comment: One typo corrected, to appear in Memoirs of the AMS

Published

2019

8. 3. My Research is DUE Tomorrow! by Elizabeth Milićević

Author

Elizabeth Milićević

Subjects

General Mathematics

Published

2021

9. Dimensions of Affine Deligne–Lusztig Varieties: A New Approach Via Labeled Folded Alcove Walks and Root Operators

Author

Elizabeth Milićević, Petra Schwer, Anne Thomas, Elizabeth Milićević, Petra Schwer, and Anne Thomas

Subjects

Group theory, Lie algebras, Algebraic varieties, Group theory and generalizations--Linear algebra, Combinatorics {For finite fields, see 11Txx}--Al, Group theory and generalizations--Special aspect, Geometry {For algebraic geometry, see 14-XX}--Fi

Abstract

Let $G$ be a reductive group over the field $F=k((t))$, where $k$ is an algebraic closure of a finite field, and let $W$ be the (extended) affine Weyl group of $G$. The associated affine Deligne–Lusztig varieties $X_x(b)$, which are indexed by elements $b \in G(F)$ and $x \in W$, were introduced by Rapoport. Basic questions about the varieties $X_x(b)$ which have remained largely open include when they are nonempty, and if nonempty, their dimension. The authors use techniques inspired by geometric group theory and combinatorial representation theory to address these questions in the case that $b$ is a pure translation, and so prove much of a sharpened version of a conjecture of Görtz, Haines, Kottwitz, and Reuman. The authors'approach is constructive and type-free, sheds new light on the reasons for existing results in the case that $b$ is basic, and reveals new patterns. Since they work only in the standard apartment of the building for $G(F)$, their results also hold in the $p$-adic context, where they formulate a definition of the dimension of a $p$-adic Deligne–Lusztig set. The authors present two immediate applications of their main results, to class polynomials of affine Hecke algebras and to affine reflection length.

Published

2019

10. Enumerations relating braid and commutation classes

Author

Rebecca Patrias, Elizabeth Milićević, Bridget Eileen Tenner, and Susanna Fishel

Subjects

Discrete mathematics, Mathematics::Combinatorics, 010102 general mathematics, 01 natural sciences, Upper and lower bounds, Cyclic permutation, 010101 applied mathematics, Combinatorics, Permutation, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, FOS: Mathematics, Braid, Enumeration, Discrete Mathematics and Combinatorics, Mathematics - Combinatorics, Combinatorics (math.CO), Commutation, 0101 mathematics, 05A05 (Primary), 05E15 (Secondary), Mathematics, MathematicsofComputing_DISCRETEMATHEMATICS

Abstract

We obtain an upper and lower bound for the number of reduced words for a permutation in terms of the number of braid classes and the number of commutation classes of the permutation. We classify the permutations that achieve each of these bounds, and enumerate both cases., 19 pages

Published

2017

11. Applying Parabolic Peterson: Affine Algebras and the Quantum Cohomology of the Grassmannian

Author

Elizabeth Milićević and Jonathan Cookmeyer

Subjects

14M15, 05E05 (Primary), 20F55, 14N15, 14N35 (Secondary), Schubert calculus, Affine Grassmannian (manifold), Homology (mathematics), Mathematics::Algebraic Topology, Combinatorics, Mathematics - Algebraic Geometry, Mathematics::Algebraic Geometry, Mathematics::K-Theory and Homology, Grassmannian, FOS: Mathematics, Mathematics - Combinatorics, Combinatorics (math.CO), Affine transformation, Isomorphism, Mathematics::Representation Theory, Algebraic Geometry (math.AG), Quotient, Quantum cohomology, Mathematics

Abstract

The Peterson isomorphism relates the homology of the affine Grassmannian to the quantum cohomology of any flag variety. In the case of a partial flag, Peterson's map is only a surjection, and one needs to quotient by a suitable ideal on the affine side to map isomorphically onto the quantum cohomology. We provide a detailed exposition of this parabolic Peterson isomorphism in the case of the Grassmannian of m-planes in complex n-space, including an explicit recipe for doing quantum Schubert calculus in terms of the appropriate subset of non-commutative k-Schur functions. As an application, we recast Postnikov's affine approach to the quantum cohomology of the Grassmannian as a consequence of parabolic Peterson by showing that the affine nilTemperley-Lieb algebra arises naturally when forming the requisite quotient of the homology of the affine Grassmannian., 37 pages, most figures best viewed in color; typos corrected, sections reorganized, minor improvements to the exposition; version with condensed background section to appear in J. Comb

Published

2017

12. Genius at Play: A Book Review

Author

Elizabeth Milićević

Subjects

Literature, business.industry, General Mathematics, media_common.quotation_subject, Art, business, Genius, media_common

Published

2018

13. Equivariant Quantum Cohomology of the Grassmannian via the Rim Hook Rule

Author

Kaisa Taipale, Anna Bertiger, and Elizabeth Milićević

Subjects

Pure mathematics, Mathematics::Combinatorics, Flag (linear algebra), Schubert calculus, Complex torus, Cohomology, Mathematics - Algebraic Geometry, Mathematics::Algebraic Geometry, Grassmannian, FOS: Mathematics, Mathematics - Combinatorics, Equivariant map, Isomorphism, Combinatorics (math.CO), Mathematics::Representation Theory, Algebraic Geometry (math.AG), 14N35, 14N15, 14M15 (Primary), 55N91, 05E05 (Secondary), Mathematics, Quantum cohomology

Abstract

A driving question in (quantum) cohomology of flag varieties is to find non-recursive, positive combinatorial formulas for expressing the product of two classes in a particularly nice basis, called the Schubert basis. Bertram, Ciocan-Fontanine and Fulton provided a way to compute quantum products of Schubert classes in the Grassmannian of k-planes in complex n-space by doing classical multiplication and then applying a combinatorial rim hook rule which yields the quantum parameter. In this paper, we provide a generalization of this rim hook rule to the setting in which there is also an action of the complex torus. Combining this result with Knutson and Tao's puzzle rule then gives an effective algorithm for computing all equivariant quantum Littlewood-Richardson coefficients. Interestingly, this rule requires a specialization of torus weights modulo n, suggesting a direct connection to the Peterson isomorphism relating quantum and affine Schubert calculus., Comment: 24 pages and 4 figures; typos corrected; final version to appear in Algebraic Combinatorics

Published

2014