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
PosTag(s)
Info
AS.110.601 (01)
Algebra I
TTh 12:00PM - 1:15PM
Shokurov, Vyacheslav
Krieger Laverty
Algebra I AS.110.601 (01)
The first of a two semester algebra sequence to provide the student with the foundations for Number Theory, Algebraic Geometry, Representation Theory, and other areas. Topics include refined elements of group theory, commutative algebra, Noetherian rings, local rings, modules, and rudiments of category theory, homological algebra, field theory, Galois theory, and non-commutative algebras.
Credits: 0.00
Level: Graduate
Days/Times: TTh 12:00PM - 1:15PM
Instructor: Shokurov, Vyacheslav
Room: Krieger Laverty
Status: Open
Seats Available: 20/20
PosTag(s): n/a
AS.110.605 (01)
Real Variables
MW 12:00PM - 1:15PM
Sogge, Christopher
Krieger 302
Real Variables AS.110.605 (01)
This course covers the theory of the Lebesgue theory of integration in d-dimensional Euclidean space, and offers a brief introduction to the theory of Hilbert spaces. Topics include the Lebesgue measure on Euclidean space, the Lebesgue integral, classical convergence results for the Lebesgue integral, Fubini's theorem, the spaces of L^1 and L^2 functions.
Credits: 0.00
Level: Graduate
Days/Times: MW 12:00PM - 1:15PM
Instructor: Sogge, Christopher
Room: Krieger 302
Status: Open
Seats Available: 20/20
PosTag(s): n/a
AS.110.608 (01)
Riemann Surfaces
MW 12:00PM - 1:15PM
Bernstein, Jacob
Krieger 300
Riemann Surfaces AS.110.608 (01)
Abstract Riemann surfaces. Examples: algebraic curves, elliptic curves and functions on them. Holomorphic and meromorphic functions and differential forms, divisors and the Mittag-Leffler problem. The analytic genus. Bezout's theorem and applications. Introduction to sheaf theory, with applications to constructing linear series of meromorphic functions. Serre duality, the existence of meromorphic functions on Riemann surfaces, the equality of the topological and analytic genera, the equivalence of algebraic curves and compact Riemann surfaces, the Riemann-Roch theorem. Period matrices and the Abel-Jacobi mapping, Jacobi inversion, the Torelli theorem. Uniformization (time permitting).
Credits: 0.00
Level: Graduate
Days/Times: MW 12:00PM - 1:15PM
Instructor: Bernstein, Jacob
Room: Krieger 300
Status: Open
Seats Available: 20/20
PosTag(s): n/a
AS.110.615 (01)
Algebraic Topology I
MW 1:30PM - 2:45PM
Staff
Krieger 302
Algebraic Topology I AS.110.615 (01)
Singular homology theory, cohomology and products, category theory and homological algebra, Künneth and universal coefficient theorems, Poincaré and Alexander duality theorems, Lefschetz fixed-point theorem, covering spaces and fundamental groups. Prerequsites: the equivalent of one semester in both Abstract Algebra and Real Analysis (specifically, point set topology).
Credits: 0.00
Level: Graduate
Days/Times: MW 1:30PM - 2:45PM
Instructor: Staff
Room: Krieger 302
Status: Open
Seats Available: 18/20
PosTag(s): n/a
AS.110.617 (01)
Number Theory I
TTh 10:30AM - 11:45AM
Staff
Croft Hall G02
Number Theory I AS.110.617 (01)
Elements of advanced algebra and number theory. Possible topics for the year-long sequence include local and global fields, Galois cohomology, semisimple algebras, class field theory, elliptic curves, modular and automorphic forms, integral representations of L-functions, adelic geometry and function fields, fundamental notions in arithmetic geometry (including Arakelov and diophantine geometry).
Credits: 0.00
Level: Graduate
Days/Times: TTh 10:30AM - 11:45AM
Instructor: Staff
Room: Croft Hall G02
Status: Open
Seats Available: 18/20
PosTag(s): n/a
AS.110.631 (01)
Partial Differential Equations I
TTh 1:30PM - 2:45PM
Sire, Yannick
Partial Differential Equations I AS.110.631 (01)
This course is the first in the sequence about the general theory of PDEs. The beginning of the course will describe several important results of functional analysis which are instrumental for the study of PDEs: Hahn-Banach theorem, Uniform boundedness and closed graph theorems, reflexive spaces and weak topologies, elements of semi-group theory. Then we will describe the basic theory of Sobolev spaces and the standard existence theory for (initial) boundary value problems of elliptic/parabolic type. Finally, the rest of the course will be devoted to finer properties of solutions of elliptic equations such as maximum principles, Harnack principles and regularity.
Credits: 0.00
Level: Graduate
Days/Times: TTh 1:30PM - 2:45PM
Instructor: Sire, Yannick
Room:
Status: Open
Seats Available: 19/20
PosTag(s): n/a
AS.110.637 (01)
Functional Analysis
MW 1:30PM - 2:45PM
Lindblad, Hans
Hackerman 320
Functional Analysis AS.110.637 (01)
This class will explore basic aspects of functional analysis, focusing mostly on normed vector spaces. This will include the Hahn-Banach and open mapping theorems, a discussion of strong and weak topologies, the theory of compact operators, and spaces of integrable functions and Sobolev spaces, with applications to the study of some partial differential equations. Prerequisite: Real Analysis
Credits: 0.00
Level: Graduate
Days/Times: MW 1:30PM - 2:45PM
Instructor: Lindblad, Hans
Room: Hackerman 320
Status: Open
Seats Available: 16/20
PosTag(s): n/a
AS.110.643 (01)
Algebraic Geometry I
TTh 10:30AM - 11:45AM
Shokurov, Vyacheslav
Krieger Laverty
Algebraic Geometry I AS.110.643 (01)
Introduction to affine varieties and projective varieties. Hilbert's theorems about polynomials in several variables with their connections to geometry. Abstract algebraic varieties and projective geometry. Dimension of varieties and smooth varieties. Sheaf theory and some notions of cohomology. Applications of sheaves to geometry; e.g., theory of divisors, rudiments of scheme theory for the understanding of the Riemann-Roch theorem for curves and surfaces. Other topics may include Jacobian varieties, resolution of singularities, birational geometry on surfaces, schemes, connections with complex analytic geometry and topology.
Credits: 0.00
Level: Graduate
Days/Times: TTh 10:30AM - 11:45AM
Instructor: Shokurov, Vyacheslav
Room: Krieger Laverty
Status: Open
Seats Available: 20/20
PosTag(s): n/a
AS.110.645 (01)
Riemannian Geometry II
TTh 10:30AM - 11:45AM
Wang, Yi
Krieger 309
Riemannian Geometry II AS.110.645 (01)
This course is a graduate-level introduction to foundational material in Riemannian Geometry. Riemannian manifolds, a smooth manifold equipped with a Riemannian metric. Topics include connections, geodesics, Jacobi fields, submanifold theory including the second fundamental form and Gauss equations, manifolds of constant curvature, comparison theorems, Morse index theorem, Hadamard theorem and Bonnet-Myers theorem.
Credits: 0.00
Level: Graduate
Days/Times: TTh 10:30AM - 11:45AM
Instructor: Wang, Yi
Room: Krieger 309
Status: Open
Seats Available: 17/20
PosTag(s): n/a
AS.110.653 (01)
Stochastic Differential Equations: An Introduction With Applications
TTh 10:30AM - 11:45AM
Lu, Fei
Hodson 216
Stochastic Differential Equations: An Introduction With Applications AS.110.653 (01)
This course is an introduction to stochastic differential equations and applications. Basic topics to be reviewed include Ito and Stratonovich integrals, Ito formula, SDEs and their integration. The course will focus on diffusion processes and diffusion theory, with topics include Markov properties, generator, Kolmogrov’s equations (Fokker-Planck equation), Feynman-Kac formula, the martingale problem, Girsanov theorem, stability and ergodicity. The course will briefly introduce applications, with topics include statistical inference of SDEs, filtering and control.
Credits: 0.00
Level: Graduate
Days/Times: TTh 10:30AM - 11:45AM
Instructor: Lu, Fei
Room: Hodson 216
Status: Open
Seats Available: 14/25
PosTag(s): n/a
AS.110.721 (01)
Topics In Homotopy Type Theory
MW 1:30PM - 2:45PM
Riehl, Emily
Maryland 109
Topics In Homotopy Type Theory AS.110.721 (01)
Homotopy type theory (HoTT) is a new proposed foundation system for mathematics that extends Martin-Löf's dependent type theory with Voevodsky's univalence axiom. Dependent type theory is a formal system for constructive mathematics, in which a theorem is proven by constructing a term in the type that encodes its statement. In Homotopy type theory, types are thought of as spaces and terms as points in those spaces. A proof that two terms in a common type are equal is now interpreted as a path between two points in a space. In particular, types might have interesting higher homotopical structure, which can be thought of as revealing fundamental differences between two proofs of a common proposition. One advantage of this foundation system is its amenability to computer formalization, which this course will illustrate by introducing the computer proof assistant Agda.
Credits: 0.00
Level: Graduate
Days/Times: MW 1:30PM - 2:45PM
Instructor: Riehl, Emily
Room: Maryland 109
Status: Open
Seats Available: 11/15
PosTag(s): n/a
AS.110.741 (01)
Topics in Partial Differential Equations
MW 1:30PM - 2:45PM
Dodson, Benjamin
Gilman 77
Topics in Partial Differential Equations AS.110.741 (01)
