DOCSLIB.ORG
Explore
Sign Up
Log In
Upload
Search
Home
» Tags
» Quantum cohomology
Quantum cohomology
Quantum Cohomology of Lagrangian and Orthogonal Grassmannians
Gromov--Witten Invariants and Quantum Cohomology
Duality and Integrability in Topological String Theory
Relative Floer and Quantum Cohomology and the Symplectic Topology of Lagrangian Submanifolds
1. Eigenvalues of Hermitian Matrices and Schubert Calculus
Applications and Combinatorics in Algebraic Geometry Frank Sottile Summary
Giambelli Formulae for the Equivariant Quantum Cohomology of the Grassmannian
Kontsevich's Formula for Rational Plane Curves
An Update of Quantum Cohomology of Homogeneous Varieties
Introduction to Quantum Cohomology
Quantum Cohomology of Slices of the Affine Grassmannian
The Quantum Lefschetz Hyperplane Principle Can Fail for Positive Orbifold Hypersurfaces
An Update on (Small) Quantum Cohomology
Gromov-Witten Invariants and Quantization of Quadratic Hamiltonians
J-Holomorphic Curves and Quantum Cohomology
INTRODUCTION to GROMOV–WITTEN THEORY and QUANTUM COHOMOLOGY Preliminary Draft Version: Please Do Not Circulate Contents 1
Flops, Motives, and Invariance of Quantum Rings
Frobenius Algebra Structures in Topological Quantum Field Theory
Top View
Gromov-Witten Classes
Arxiv:Math/0411210V2 [Math.AG] 15 Apr 2008 Quantum Cohomology Of
THE QUANTUM COHOMOLOGY RING of FLAG VARIETIES Introduction the Quantum Cohomology Ring of a Projective Manifold X Is a Deformati
Floer Cohomology with Gerbes
1. Review of Quantum Cohomology 1.1
RESEARCH STATEMENT 1. Introduction My Research Focuses
Arxiv:Alg-Geom/9608011V2 17 May 1997
Leonardo Constantin Mihalcea
Quantum Cohomology of Homogeneous Varieties: a Survey Harry Tamvakis
Arxiv:1705.01819V1 [Math.AG]
Quantum and Floer Cohomology Have the Same Ring Structure
Quantum Cohomology of Grassmannians
Gromov-Witten Invariants and Quantum Cohomology
'Quantum Cohomology of Orthogonal Grassmannians'
On Quantum Cohomology Rings of Fano Manifolds and a Formula of Vafa and Intriligator*
Advances in Algebraic Geometry Motivated by Physics
QUANTUM COHOMOLOGY of [CN /Μr] This Paper Combines Two
Enumerative Geometry and String Theory Sheldon Katz