Column one has the course number and section. Other columns show the course title, days offered, instructor's name, room number, if the course is cross-referenced with another program, and a option to view additional course information in a pop-up window.
Course # (Section)
Title
Day/Times
Instructor
Room
Info
AS.110.616 (01)
Algebraic Topology
MW 10:30AM - 11:45AM
Kitchloo, Nitya
Krieger 204
Algebraic Topology AS.110.616 (01)
Polyhedra, simplicial and singular homology theory, Lefschetz fixed-point theorem, cohomology and products, homological algebra, Künneth and universal coefficient theorems, Poincar&ecute; and Alexander duality theorems.
Credits: 0.00
Level: Graduate
Days/Times: MW 10:30AM - 11:45AM
Instructor: Kitchloo, Nitya
Room: Krieger 204
Status: Open
Seats Available: 10/15
AS.110.602 (01)
Algebra
MW 12:00PM - 1:15PM
Shokurov, Vyacheslav
Maryland 104
Algebra AS.110.602 (01)
An introductory graduate course on fundamental topics in algebra to provide the student with the foundations for Number Theory, Algebraic Geometry, and other advanced courses. Topics include group theory, commutative algebra, Noetherian rings, local rings, modules, and rudiments of category theory, homological algebra, field theory, Galois theory, and non-commutative algebras. Recommended Course Background: AS.110.401-AS.110.402
Credits: 0.00
Level: Graduate
Days/Times: MW 12:00PM - 1:15PM
Instructor: Shokurov, Vyacheslav
Room: Maryland 104
Status: Open
Seats Available: 4/15
AS.110.633 (01)
Harmonic Analysis
MW 12:00PM - 1:15PM
Dodson, Benjamin
Maryland 202
Harmonic Analysis AS.110.633 (01)
Fourier multipliers, oscillatory integrals, restriction theorems, Fourier integral operators, pseudodifferential operators, eigenfunctions. Undergrads need instructor's permission.
Credits: 0.00
Level: Graduate
Days/Times: MW 12:00PM - 1:15PM
Instructor: Dodson, Benjamin
Room: Maryland 202
Status: Open
Seats Available: 11/15
AS.110.644 (01)
Algebraic Geometry
TTh 10:30AM - 11:45AM
Han, Jingjun
Krieger 204
Algebraic Geometry AS.110.644 (01)
Affine varieties and commutative algebra. Hilbert's theorems about polynomials in several variables with their connections to geometry. General varieties and projective geometry. Dimension theory and smooth varieties. Sheaf theory and cohomology. Applications of sheaves to geometry; e.g., the Riemann-Roch Theorem. Other topics may include Jacobian varieties, resolution of singularities, geometry on surfaces, schemes, connections with complex analytic geometry and topology.
Credits: 0.00
Level: Graduate
Days/Times: TTh 10:30AM - 11:45AM
Instructor: Han, Jingjun
Room: Krieger 204
Status: Open
Seats Available: 7/10
AS.110.618 (01)
Number Theory
TTh 12:00PM - 1:15PM
Sakellaridis, Ioannis
Krieger 204
Number Theory AS.110.618 (01)
Topics in advanced algebra and number theory, including local fields and adeles, Iwasawa-Tate theory of zeta-functions and connections with Hecke's treatment, semi-simple algebras over local and number fields, adele geometry.
Credits: 0.00
Level: Graduate
Days/Times: TTh 12:00PM - 1:15PM
Instructor: Sakellaridis, Ioannis
Room: Krieger 204
Status: Open
Seats Available: 8/15
AS.110.631 (01)
Partial Differential Equations I
MW 1:30PM - 2:45PM
Sire, Yannick
Gilman 313
Partial Differential Equations I AS.110.631 (01)
An introductory graduate course in partial differential equations. Classical topics include first order equations and characteristics, the Cauchy-Kowalewski theorem, Laplace’s equations, heat equation, wave equation, fundamental solutions, weak solutions, Sobolev spaces, maximum principles.
Credits: 0.00
Level: Graduate
Days/Times: MW 1:30PM - 2:45PM
Instructor: Sire, Yannick
Room: Gilman 313
Status: Open
Seats Available: 9/15
AS.110.607 (01)
Complex Variables
TTh 10:30AM - 11:45AM
Wang, Yi
Shaffer 301
Complex Variables AS.110.607 (01)
Analytic functions of one complex variable. Topics include Mittag-Leffler Theorem, Weierstrass factorization theorem, elliptic functions, Riemann-Roch theorem, Picard theorem, and Nevanlinna theory. Recommended Course Background: AS.110.311, AS.110.405
Credits: 0.00
Level: Graduate
Days/Times: TTh 10:30AM - 11:45AM
Instructor: Wang, Yi
Room: Shaffer 301
Status: Open
Seats Available: 4/15
AS.110.726 (01)
Topics in Analysis
MTW 3:00PM - 3:50PM
Lindblad, Hans
Krieger 406
Topics in Analysis AS.110.726 (01)
The topics covered will involve the theory of calculus of Functors applied to Geometric problems like Embedding theory. Other related areas will be covered depending on the interest of the audience.
Credits: 0.00
Level: Graduate
Days/Times: MTW 3:00PM - 3:50PM
Instructor: Lindblad, Hans
Room: Krieger 406
Status: Open
Seats Available: 8/12
AS.110.619 (01)
Lie Groups and Lie Algebras
TTh 9:00AM - 10:15AM
Mramor, Alexander Everest
Krieger 204
Lie Groups and Lie Algebras AS.110.619 (01)
Lie groups and Lie algebras, classification of complex semi-simple Lie algebras, compact forms, representations and Weyl formulas, symmetric Riemannian spaces.
Credits: 0.00
Level: Graduate
Days/Times: TTh 9:00AM - 10:15AM
Instructor: Mramor, Alexander Everest
Room: Krieger 204
Status: Open
Seats Available: 16/20
AS.110.646 (01)
Riemannian Geometry
MW 1:30PM - 2:45PM
Bernstein, Jacob
Gilman 381
Riemannian Geometry AS.110.646 (01)
The goal is to give a self-contained course on mean curvature flow, starting with the basic linear heat equation in Euclidean space and – hopefully – getting to topics of current research. Mean curvature flow is a geometric heat equation that shares many properties with Ricci flow, harmonic map heat flow, Yang-Mills flow and the Navier-Stokes equations. Recommended Course Background: AS.110.605 and an undergraduate course in differential geometry; AS.110.645 and AS.110.631
Credits: 0.00
Level: Graduate
Days/Times: MW 1:30PM - 2:45PM
Instructor: Bernstein, Jacob
Room: Gilman 381
Status: Open
Seats Available: 10/15
AS.110.733 (01)
Topics In Alg Num Theory
MW 3:00PM - 4:15PM
Savitt, David Lawrence
Topics In Alg Num Theory AS.110.733 (01)
Credits: 0.00
Level: Graduate
Days/Times: MW 3:00PM - 4:15PM
Instructor: Savitt, David Lawrence
Room:
Status: Open
Seats Available: 5/12
AS.110.741 (01)
Topics in Partial Differential Equations
MW 10:30AM - 11:45AM
Sire, Yannick
Maryland 202
Topics in Partial Differential Equations AS.110.741 (01)
KAM theory is aiming at constructing invariant (under the flow of a dynamical system in finite or infinite dimensions) tori (as in invariant manifold) for Hamiltonian systems. I will start by reminders about symplectic geometry and topology. Then I will present an easy proof of the Siegel theorem in complex analysis using an easy version of the KAM scheme. Several lectures will be dedicated to “hard implicit function theorems” via Nash-Moser iterations in Frechet spaces. I will then state the KAM theorem in its original form and its modern variants and I will provide the three different proofs of Kolmogorov, Arnold and Moser in finite dimensions. Finally, I will explain the major difficulties in the case of Hamiltonian PDEs to adapt the previous proofs and will move on to some known results such as the ones of Kuksin, Poeschel, Bourgain and De La Llave and myself. I will probably explain in detail the results of Bourgain for nonlinear Schrodinger.
Credits: 0.00
Level: Graduate
Days/Times: MW 10:30AM - 11:45AM
Instructor: Sire, Yannick
Room: Maryland 202
Status: Open
Seats Available: 8/12
AS.110.801 (06)
Thesis Research
Maggioni, Mauro
Thesis Research AS.110.801 (06)
Credits: 0.00
Level: Graduate
Days/Times:
Instructor: Maggioni, Mauro
Room:
Status: Open
Seats Available: 2/5
AS.110.801 (04)
Thesis Research
Sogge, Christopher
Thesis Research AS.110.801 (04)
Credits: 0.00
Level: Graduate
Days/Times:
Instructor: Sogge, Christopher
Room:
Status: Open
Seats Available: 4/5
AS.110.801 (03)
Thesis Research
Lindblad, Hans
Thesis Research AS.110.801 (03)
Credits: 0.00
Level: Graduate
Days/Times:
Instructor: Lindblad, Hans
Room:
Status: Open
Seats Available: 3/5
AS.110.757 (01)
Topics in Stochastic Dynamical Systems
TTh 10:30AM - 11:45AM
Lu, Fei
Shriver Hall 104
Topics in Stochastic Dynamical Systems AS.110.757 (01)
The course will present an introduction to stochastic dynamical systems and some applications in model reduction and data assimilation. The main focus will be on stability and ergodicity of stochastic dynamical systems, including stochastic differential equations driven by white and fractional noise, and their numerical approximations. We will then discuss model reduction, focusing on Mori-Zwanzig formalism and approximation of the generalized Langevin equation, and methods on the parametric inference of related stochastic systems. Data assimilation and stochastic control will also be briefly introduced.
