Motivic Cohomology, Motivic Homotopy Theory, And K-Theory

Description

This project concerns the investigation of connections between algebra, algebraic geometry, and topology. Algebraic geometry studies properties of geometric objects that are invariant under transformations given by polynomial functions, while topology studies properties invariant under smooth, continuous deformations. The goal is to gain a better understanding of the way that structures in algebraic geometry are reflected by structures in topology, using a blend of algebraic and topological methods. The investigator aims to settle several important longstanding conjectures in this area. One part of the project is to find a cleaner proof of the recently-verified Bloch-Kato conjecture. A related part of the project is to understand how Voevodsky's slice filtration is related to algebraic cobordism and other motivic spectra and to verify several of the slice conjectures. The investigator will also study the relationship between the singularities of a variety, its K-theory, and its cdh-cohomology, using recently-developed cohomological techniques. Another part of this project is to relate the algebraic Witt group of a real surface to a recently-developed topological invariant, one that is easier to compute.
StatusActive
Effective start/end date8/1/177/31/20

Funding

  • National Science Foundation (NSF)

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Motivic Cohomology
Homotopy Theory
Algebraic Geometry
K-theory
Slice
Witt Group
Topology
Algebraic topology
Topological Methods
Cobordism
Geometric object
Topological Invariants
Invariant
Algebraic Methods
Algebraic Groups
Polynomial function
Filtration
Cohomology
Singularity
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