- Course Outline ---SPRING 2011 MATH 588: OPTIMIZATION IN NETWORKS
- COMINUSCULE TABLEAU COMBINATORICS HUGH THOMAS AND ALEXANDER YONG
- Enumerative formulas in Schubert calculus
- TABLEAU COMPLEXES ALLEN KNUTSON, EZRA MILLER, AND ALEXANDER YONG
- STABLE GROTHENDIECK POLYNOMIALS AND KTHEORETIC FACTOR SEQUENCES
- Course Description ---Spring 2009 NONLINEAR PROGRAMMING
- AN APPROXIMATION ALGORITHM FOR COUNTING CONTINGENCY TABLES
- GROTHENDIECK POLYNOMIALS AND QUIVER FORMULAS ANDERS S. BUCH, ANDREW KRESCH, HARRY TAMVAKIS, AND ALEXANDER YONG
- Cominuscule combinatorics
- Mathematical Research Letters, to appear, March 2005 QUIVER COEFFICIENTS ARE SCHUBERT
- WHAT IS A YOUNG TABLEAU? ALEXANDER YONG
- THE DIRECT SUM MAP ON GRASSMANNIANS AND JEU DE TAQUIN FOR INCREASING TABLEAUX
- OBNER BASIS FOR KAZHDANLUSZTIG IDEALS ALEXANDER WOO AND ALEXANDER YONG
- ON COMBINATORICS OF QUIVER COMPONENT FORMULAS ALEXANDER YONG
- OBNER GEOMETRY OF VERTEX DECOMPOSITIONS AND OF FLAGGED TABLEAUX
- Dyck paths and a bijection for multisets of hook Ian Goulden and Alexander Yong
- STABLE GROTHENDIECK POLYNOMIALS AND KTHEORETIC FACTOR SEQUENCES
- DEGREE BOUNDS IN QUANTUM SCHUBERT CALCULUS ALEXANDER YONG
- Treelike properties of cycle factorizations Ian Goulden \Lambda and Alexander Yong y
- subsequences ayong@math.uiuc.edu http://www.math.uiuc.edu/ayong
- GOVERNING SINGULARITIES OF SCHUBERT VARIETIES ALEXANDER WOO AND ALEXANDER YONG
- COMBINATORIAL AND COMPUTATIONAL COMMUTATIVE ALGEBRA: MONDAY AFTERNOON TUTORIAL
- PATCH IDEALS AND PETERSON VARIETIES ERIK INSKO AND ALEXANDER YONG
- Tableau insertion algorithms in geometry and representation theory
- MATH 580, FALL 2011 HOMEWORK 12 WARMUP PROBLEMS: Section 14.1 #1, 2, 4, 6, 10, 12. Section 14.2 #1, 2, 3. Section
- AN S 3 SYMMETRIC LITTLEWOODRICHARDSON RULE HUGH THOMAS AND ALEXANDER YONG
- combinatorics ayong@math.umn.edu http://www.math.umn.edu/ayong
- LECTURE NOTES ON THE KTHEORY OF THE FLAG VARIETY AND THE FOMINKIRILLOV QUADRATIC ALGEBRA
- MATH 595 (SPRING 2009) PROBLEMS LIST ALEXANDER YONG
- SOME DEGENERATIONS OF KAZHDANLUSZTIG IDEALS AND MULTIPLICITIES OF SCHUBERT VARIETIES
- PRESENTING THE COHOMOLOGY OF A SCHUBERT VARIETY VICTOR REINER, ALEXANDER WOO, AND ALEXANDER YONG
- MULTIPLICITYFREE SCHUBERT CALCULUS HUGH THOMAS AND ALEXANDER YONG
- A COMBINATORIAL RULE FOR (CO)MINUSCULE SCHUBERT CALCULUS HUGH THOMAS AND ALEXANDER YONG
- A FORMULA FOR KTHEORY TRUNCATION SCHUBERT CALCULUS ALLEN KNUTSON AND ALEXANDER YONG
- SCHUBERT POLYNOMIALS AND QUIVER FORMULAS ANDERS S. BUCH, ANDREW KRESCH, HARRY TAMVAKIS, AND ALEXANDER YONG
- A JEU DE TAQUIN THEORY FOR INCREASING TABLEAUX, WITH APPLICATIONS TO KTHEORETIC SCHUBERT CALCULUS
- Curriculum Vitae of Alexander Yong Employment
- On Combinatorics of Degeneracy Loci Alexander T F Yong
- Schubert Class Formulas Alexander Yong
- Grobner bases and singularities of Schubert Alexander Yong
- MATH 172 Assignment 1 Fall 2004 Give complete solutions/proofs to the following problems.1
- MATH 580, FALL 2011 -HOMEWORK 7 WARMUP PROBLEMS: Section 6.1 #2, 3, 4, 6, 7, 8. Section 6.2 #1, 2, 3. Section 6.3
- MATH 286 --FALL 2008 TEST III DIFFERENTIAL EQUATIONS PLUS
- MATH 172 Assignment 3 Fall 2004 Give complete solutions/proofs to the following problems. This assign-
- MATH 580 / CS 571, FALL 2011 -HOMEWORK 2 WARMUP PROBLEMS: Section 1.3 #6. Section 2.1 #1, 2, 5, 6, 8. Do not write up!
- MATH 286 --FALL 2008 TEST II DIFFERENTIAL EQUATIONS PLUS
- Algebraic combinatorics Alexander Yong
- MATH 172 Assignment 2 Fall 2004 Give complete solutions/proofs to the following problems. This assign-
- MATH 580, FALL 2011 -HOMEWORK 11 WARMUP PROBLEMS: Section 12.1 #2, 3, 4. Section 12.2 #1, 3, 4, 5, 7.
- NINTH BAY AREA DISCRETE MATH DAY University of California, Berkeley
- MATH 580, FALL 2011 -HOMEWORK 4 WARMUP PROBLEMS: Section 3.1 #6. Section 3.2 #1, 2, 3, 4. Section 3.3 #1, 2, 4, 8,
- Linear Programming in the Community In this project, we aimed to help a food pantry service by selecting the optimal
- Commutative Algebra and Algebraic Geometry Organizer: D. Eisenbud
- MATH 580, FALL 2011 -HOMEWORK 1 WARMUP PROBLEMS: Section 1.1 #3, 4, 5, 7, 8, 11, 12, 14. Section 1.2 #1, 2, 4, 6, 8, 10.
- Drift configurations Alexander Yong
- Application of linear programming methods to determine the best location of concrete dispatch plants
- Department of Mathematics, University of California, San Diego
- 2 Chapter 0: Introduction Introduction 3 Introduction
- COMBINATORIAL MODELS IN SCHUBERT GEOMETRY My principal mathematical interests so far have been the construction of combinatorial
- MATH 580, FALL 2011 -HOMEWORK 10 WARMUP PROBLEMS: Section 10.1 #1, 3, 5, 1. Section 10.2 #1, 2, 3. Section 10.2 #1.
- Curriculum Vitae of Alexander Yong Employment
- Stanford Algebraic Geometry --Seminar --
- Eighth Bay Area Discrete Mathematics Day Stanford University
- MATH 580, FALL 2011 -HOMEWORK 9 WARMUP PROBLEMS: Section 8.1 #1, 4, 5, 6, 7. Section 8.2 #1, 3, 6, 7. Section 8.3
- MATH 286 --FALL 2008 TEST I DIFFERENTIAL EQUATIONS PLUS
- TEACHING STATEMENT OF ALEXANDER YONG I have taught mathematics to students at various levels and in a number of different
- MATH 580, FALL 2011 -HOMEWORK 6 READING: Chapter 5 is background reading, with some highlights in class. It has many
- MATH 286: INTRODUCTION TO DIFFERENTIAL EQUATIONS PLUS FALL 2008 SYLLABUS
- MATH 580, FALL 2011 -HOMEWORK 8 WARMUP PROBLEMS: Section 7.1 #1, 2, 3, 6, 7. Section 7.2 #2, 4, 6, 7, 8, 10, 14.
- Patch ideals and Peterson varieties Alexander Yong
- COMBINATORIAL FORMULAE FOR GROTHENDIECK-DEMAZURE AND GROTHENDIECK POLYNOMIALS
- U. of Illinois MATH 413 Chapter 7.5 In class exercises This set of problems works through problems in Section 7.5 on inho-
- K-THEORETIC SCHUBERT CALCULUS FOR OG(n, 2n + 1) AND JEU DE TAQUIN FOR SHIFTED INCREASING TABLEAUX
- MATH 580, FALL 2011 -HOMEWORK 5 WARMUP PROBLEMS: Section 3.4: #1, 2, 3. Section 4.1: #1, 2, 3, 5, 6, 8, 9, 12.
- Syllabus of the course MATH 482 LINEAR PROGRAMMING AND COMBINATORIAL OPTIMIZATION
- MATH 580 / CS 571, FALL 2010 -HOMEWORK 3 WARMUP PROBLEMS: Section2.2 #1, 2, 3, 8, 9. Section2.3 #1, 2. Section3.1 #1, 2, 3, 4, 5.
