Mathematics Colloquia and Seminars

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A classic problem in knot theory is the cosmetic crossing conjecture. This conjecture asserts that a crossing change will always change the knot type, unless the crossing is nugatory. In the main geometry seminar I'll describe an obstruction to so-called "cosmetic" crossing changes. In the student seminar, I'll show how to use that obstruction to produce new infinite families of knots for which the conjecture is true. In the process, we'll review branched double covers, L-spaces, and discuss some computational techniques which arise in various homology theories.