MATH 321
Knot Theory Spring 2022
Division III Quantative/Formal Reasoning

Class Details

Take a piece of string, tie a knot in it, and glue the ends together. The result is a knotted circle, known as a knot. For the last 100 years, mathematicians have studied knots, asking such questions as, “Given a nasty tangled knot, how do you tell if it can be untangled without cutting it open?” Some of the most interesting advances in knot theory have occurred in the last ten years.This course is an introduction to the theory of knots. Among other topics, we will cover methods of knot tabulation, surfaces applied to knots, polynomials associated to knots, and relationships between knot theory and chemistry and physics. In addition to learning the theory, we will look at open problems in the field.
The Class: Format: lecture
Limit: 30
Expected: 25
Class#: 3268
Grading: yes pass/fail option, yes fifth course option
Requirements/Evaluation: problem sets, midterms, a paper and a final exam
Prerequisites: MATH 250 or permission of instructor
Enrollment Preferences: seniors, junior, sophomores, first year
Distributions: Division III Quantative/Formal Reasoning
QFR Notes: This is a quantitative course.

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