OS/Browser: WebVac (nee Pita) (webmaster@pita.stanford.edu)
| IMA Annual Program workshops and tutorials |
| AP Workshop: User-Centered Modeling May 07-11, 2012 |
| AP Workshop: Machine Learning: Theory and Computation March 26-30, 2012 |
| AP Workshop: Network Links: Connecting Social, Communication, and Biological Network Analysis February 27-March 02, 2012 |
| AP Workshop: Group Testing Designs, Algorithms, and Applications to Biology February 13-17, 2012 |
| AP Workshop: Large Data Sets in Medical Informatics November 14-18, 2011 |
| AP Workshop: High Dimensional Phenomena September 26-30, 2011 |
| AP Workshop: Large-scale Inverse Problems and Quantification of Uncertainty June 06-10, 2011 |
| AP Workshop: Societally Relevant Computing April 11-15, 2011 |
| AP Workshop: Computing in Image Processing, Computer Graphics, Virtual Surgery, and Sports March 07-11, 2011 |
| Tutorial: Computing and Image Processing with Data Related to Humans and Human Activities March 05-06, 2011 |
| AP Workshop: High Performance Computing and Emerging Architectures January 10-14, 2011 |
| Tutorial: Scientific Computing Using Graphics Processors January 09, 2011 |
| AP Workshop: Numerical Solutions of Partial Differential Equations: Novel Discretization Techniques November 01-05, 2010 |
| AP Workshop: Computing with Uncertainty: Mathematical Modeling, Numerical Approximation and Large Scale Optimization of Complex Systems with Uncertainty October 18-22, 2010 |
| Tutorial: Computing with Uncertainty October 16-17, 2010 |
| AP Workshop: Natural Locomotion in Fluids and on Surfaces: Swimming, Flying, and Sliding June 01-05, 2010 |
| AP Workshop: Transport and Mixing in Complex and Turbulent Flows April 12-16, 2010 |
| Tutorial: Transport and Mixing in Complex and Turbulent Flows April 11, 2010 |
| Tutorial: Tutorial on Analysis and Computation of Incompressible Fluid Flow February 21, 2010 |
| IMA Hot Topics workshops and special events |
| Special Workshop: Workshop for Women in Analysis and PDE May 30-June 02, 2012 |
| Special Workshop: The Mathematics of the New Financial Systems May 17-19, 2012 |
| Special Workshop: Second Abel Conference: A Celebration of John Milnor January 30-February 01, 2012 |
| Special Workshop: Macaulay2 July 25-29, 2011 |
| Special Workshop: Uncertainty Quantification in Industrial and Energy Applications: Experiences and Challenges June 02-04, 2011 |
| Special Workshop: Strain Induced Shape Formation: Analysis, Geometry and Materials Science May 16-20, 2011 |
| Special Workshop: First Abel Conference A Mathematical Celebration of John Tate January 03-05, 2011 |
| Special Workshop: Kickoff Workshop for Project MOSAIC June 30-July 02, 2010 |
| Special Workshop: Physical Knotting and Linking and its Applications April 09, 2010 |
| Special Workshop: Career Options for Underrepresented Groups in Mathematical Sciences March 25-27, 2010 |
| IMA Seminars on Industrial Problems |
| Industrial Problems Seminar: Sathiya Keerthi: Large scale information extraction from the web February 11, 2011 |
| Industrial Problems Seminar: Genetha Anne Gray - Identifying and quantifying uncertainty in computational models May 07, 2010 |
| Industrial Problems Seminar: Anthony Jose Kearsley - Optimal chemical spectroscopy April 30, 2010 |
| Industrial Problems Seminar: Bonita Saunders - Applying numerical grid generation to the visualization of complex function data April 09, 2010 |
| IMA Postdoc Seminars |
| IMA New Directions short courses |
 | Lecture 1 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 1 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 2 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 1 - Automatic differentiation methods in computational dynamical systems: invariant manifolds and normal forms |
| Lecture 3 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 2 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 3 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Ensemble Dynamics and Bred Vectors |
| Lecture 1 -Computation of limit cycles and their isochrons: Applications to biology |
| Lecture 4 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 4 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 5 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 6 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 5 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 6 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 7 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 2 - Automatic differentiation methods in computational dynamical systems: invariant manifolds and normal forms |
| Lecture 7 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 8 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 8 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 2 - Computation of limit cycles and their isochrons: Applications to biology |
| Lecture 3 - Automatic differentiation methods in computational dynamical systems: invariant manifolds and normal forms |
| Lecture 9 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 9 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 3 - Numerical implementation of computations of invariant tori in Hamiltonian systems |
| Lecture 1 - Space Mission Design with Dynamical Systems Theory |
| Lecture 2 - Space Mission Design with Dynamical Systems Theory |
| Exchange lemmas |
| Loss of normal hyperbolicity |
| Lyapunov exponents, periodic orbits, and horseshoes for semiflows on Hilbert space |
| Small solutions of nonlinear Schrodinger equations near first excited states |
| Conditional Stability Theorems for Special Solutions of Nonlinear PDEs |
| Stable and unstable manifolds for bisemigroups |
| Generalized cyclic feedback system for the biomedical interaction network |
| Numerical Fourier analysis of quasi-periodic functions |
| Differential equations with multiple lags |
| Numerical study of regularity of functions related to critical objects |
| Breakup of an invariant circle in a noninvertible map of the plane |
| Some observations from computations of the Kohn-M\"{u}ller model |
| Central Configurations of the N-body problem. |
| Monge-Kantorovich optimal transport problem |
| Energy and emissions markets, and the existing cap-and-trade schemes |
| Simulations of realistic EU ETS models joint work with U. Cetin & P. Barrieu (London School of Economics) |
| Strictly convex transportation costs |
| Discrete time competitive equilibrium models for cap-and-trade schemes and the carbon tax |
| Implementation of a simple model: first example |
| The case cost=distance |
| Mathematical models for allocation mechanisms and cost distribution |
| Implementation of a simple model: second example |
| Economic applications of optimal transport |
| Discrete time competitive equilibrium models for cap-and-trade schemes and the clean development mechanism |
| Non-constant discount rates, time inconsistency, and the golden rule |
| Congested transport |
| Stochastic optimization and first continuous time models of cap-and-trade schemes |
| The Merton problem with hyperbolic discounting |
| Binary martingales and option pricing: 1) Reduced form models; 2) Perturbation methods |
| Stochastic target problems and viscosity solutions |
| Martingale representation theorem for the G-expectation |
| Second order stochastic target problems |
| Singular BSDEs appearing in cap-and-trade models |
| Strict local martingale deflators and pricing American call-type options |
| Dynamic oligopolies and differential games. I |
| Backward stochastic differential equations and connection with semilinear PDEs |
| Game theory, Nash equilibrium, and electricity prices with strategic market players |
| Evaluating regulatory strategies for emmision abatement - An engineering approach |
| Optimal switching problems and applications in energy finance |
| Second order backward stochastic differential equations and connection with fully nonlinear PDEs |
| Stochastic games: Pontryagin maximum principle and the Isaacs conditions |
| Dynamic oligopolies and differential games. II |
| Numerical methods for BSDEs and applications |
| Examples of linear-quadratic stochastic games in environmental finance |
| New Directions Short Course: Invariant Objects in Dynamical Systems and their Applications June 20-July 01, 2011 |
| Lecture 1 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 1 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 2 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 1 - Automatic differentiation methods in computational dynamical systems: invariant manifolds and normal forms |
| Lecture 3 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 2 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 3 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Ensemble Dynamics and Bred Vectors |
| Lecture 1 -Computation of limit cycles and their isochrons: Applications to biology |
| Lecture 4 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 4 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 5 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 6 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 5 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 6 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 7 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 2 - Automatic differentiation methods in computational dynamical systems: invariant manifolds and normal forms |
| Lecture 7 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 8 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 8 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 2 - Computation of limit cycles and their isochrons: Applications to biology |
| Lecture 3 - Automatic differentiation methods in computational dynamical systems: invariant manifolds and normal forms |
| Lecture 9 - Quasi-periodic solutions in dynamical systems and their role in global dynamics |
| Lecture 9 - Normally Hyperbolic Invariant Manifolds: Existence, Persistence, Approximation, and Their Applications |
| Lecture 3 - Numerical implementation of computations of invariant tori in Hamiltonian systems |
| Lecture 1 - Space Mission Design with Dynamical Systems Theory |
| Lecture 2 - Space Mission Design with Dynamical Systems Theory |
| Exchange lemmas |
| Loss of normal hyperbolicity |
| Lyapunov exponents, periodic orbits, and horseshoes for semiflows on Hilbert space |
| Small solutions of nonlinear Schrodinger equations near first excited states |
| Conditional Stability Theorems for Special Solutions of Nonlinear PDEs |
| Stable and unstable manifolds for bisemigroups |
| Generalized cyclic feedback system for the biomedical interaction network |
| Numerical Fourier analysis of quasi-periodic functions |
| Differential equations with multiple lags |
| Numerical study of regularity of functions related to critical objects |
| Breakup of an invariant circle in a noninvertible map of the plane |
| Some observations from computations of the Kohn-M\"{u}ller model |
| Central Configurations of the N-body problem. |
| New Directions Short Course: New Directions Short Course: New Mathematical Models in Economics and Finance June 07-18, 2010 |
| Monge-Kantorovich optimal transport problem |
| Energy and emissions markets, and the existing cap-and-trade schemes |
| Simulations of realistic EU ETS models joint work with U. Cetin & P. Barrieu (London School of Economics) |
| Strictly convex transportation costs |
| Discrete time competitive equilibrium models for cap-and-trade schemes and the carbon tax |
| Implementation of a simple model: first example |
| The case cost=distance |
| Mathematical models for allocation mechanisms and cost distribution |
| Implementation of a simple model: second example |
| Economic applications of optimal transport |
| Discrete time competitive equilibrium models for cap-and-trade schemes and the clean development mechanism |
| Non-constant discount rates, time inconsistency, and the golden rule |
| Congested transport |
| Stochastic optimization and first continuous time models of cap-and-trade schemes |
| The Merton problem with hyperbolic discounting |
| Binary martingales and option pricing: 1) Reduced form models; 2) Perturbation methods |
| Stochastic target problems and viscosity solutions |
| Martingale representation theorem for the G-expectation |
| Second order stochastic target problems |
| Singular BSDEs appearing in cap-and-trade models |
| Strict local martingale deflators and pricing American call-type options |
| Dynamic oligopolies and differential games. I |
| Backward stochastic differential equations and connection with semilinear PDEs |
| Game theory, Nash equilibrium, and electricity prices with strategic market players |
| Evaluating regulatory strategies for emmision abatement - An engineering approach |
| Optimal switching problems and applications in energy finance |
| Second order backward stochastic differential equations and connection with fully nonlinear PDEs |
| Stochastic games: Pontryagin maximum principle and the Isaacs conditions |
| Dynamic oligopolies and differential games. II |
| Numerical methods for BSDEs and applications |
| Examples of linear-quadratic stochastic games in environmental finance |
| IMA Mathematical Modeling in Industry |
| IMA Topics Courses |
| Finite Element Exterior Calculus Course I Douglas N. Arnold (School of Mathematics, University of Minnesota) |
| Finite Element Exterior Calculus Course II Douglas N. Arnold (School of Mathematics, University of Minnesota) |
| Finite Element Exterior Calculus Course III Douglas N. Arnold (School of Mathematics, University of Minnesota) |
| Finite Element Exterior Calculus Course IV |
| Finite Element Exterior Calculus Course V Douglas N. Arnold (School of Mathematics, University of Minnesota) |
| Finite Element Exterior Calculus Course VI Douglas N. Arnold (School of Mathematics, University of Minnesota) |
| Finite Element Exterior Calculus Course VII Douglas N. Arnold (School of Mathematics, University of Minnesota) |
| Finite Element Exterior Calculus Course VIII Douglas N. Arnold (School of Mathematics, University of Minnesota) |