Topology

Topology is the mathematical study of those properties that are preserved through continuous deformations of objects. A circle is topologically equivalent to an ellipse, a sphere is equivalent to a cube, and a coffee cup to a donut. Topology began with the study of curves, surfaces, and other objects in the plane and three-space. It can be used to abstract the inherent connectivity of objects while ignoring their detailed form. The "objects" of topology are formally defined as topological spaces. If two spaces have the same topological properties, they are said to be homeomorphic; if one can be continuously deformed into the other, they are said to be homotopy equivalent.

The basic language of topology is known as point-set topology. Algebraic topology is the study of algebraic objects attached to topological spaces. The algebraic invariants reflect some of the topological structure of the spaces. The algebraic tools include homology groups, cohomology rings, homotopy groups, derived functors, and spectral sequences. Differential topology is the field dealing with differentiable functions on differentiable manifolds, vector fields, and foliations. It arises naturally from the study of differential equations, and is closely related to differential geometry. These fields have many applications in physics, notably in the theory of relativity. Geometric topology is the study of manifolds and their embeddings, with representative topics being knot theory and braid groups. It has come over time to be almost synonymous with low-dimensional topology, concerning in particular objects of two, three, or four dimensions.

David Massey studies the local topology of singular spaces, especially complex analytic singular spaces. Many of his results revolve around finding effectively calculable algebraic data that describe or control the topology of the singularities in the space.

Egon Schulte studies discrete structures in geometry and combinatorics, such as polytopes, maps on surfaces, tessellations on manifolds, complexes, and graphs. The classification of regular abstract polytopes by global or local topological type is a prominent part of his Abstract Regular Polytopes research monograph with Peter McMullen.

Alex Suciu's research interests are in topology, and how it relates to algebra, geometry, and combinatorics. He studies cohomology jumping loci, hyperplane arrangements, and polyhedral products, as well as various problems concerning the topology and geometry of knots, links, and manifolds, and the homology and lower central series of discrete groups.

Last modified October 29, 2009