Compatability Learning Seminar
Dino Rossegger, Pure Math Department, University of Waterloo
"Analytic complete equivalence relations and their degree spectra"
Dino Rossegger, Pure Math Department, University of Waterloo
"Analytic complete equivalence relations and their degree spectra"
Yi Wang, State University of New York at Buffalo
"Arveson-Douglas Conjecture --- a Harmonic Analysis Approach"
Maggie Miller, Princeton University
"Light bulbs in 4-manifolds"
Wilson Poulter, Department of Pure Mathematics, University of Waterloo
"NIP IX"
We continue section 3.2 of Simon's Guide to NIP theories.
MC 5413
Jeremy Usatine, Brown University
"Hyperplane Arrangements and Compactifying the Milnor Fiber"
Milnor fibers are invariants that arise in the study of hypersurface singularities. A major open conjecture predicts that for hyperplane arrangements, the Betti numbers of the Milnor fiber depend only on the combinatorics of the arrangement. I will discuss how tropical geometry can be used to study related invariants, the virtual Hodge numbers of a hyperplane arrangement's Milnor fiber. This talk is based on joint work with Max Kutler.
Hongdi Huang, Department of Pure Mathematics, University of Waterloo
In this very kick-off talk, we will go through section 1.1. We aim to recall/learn some basic notions of manifolds with boundary and orientations, and Morse functions in the section. We also introduce the slightly nonstandard notion of in-boundary and out-boundary, which is particularly convenient for the treatment of cobordisms. Besides, we will take about the outline and the goals of this seminar.
MC 5417
There will be an organizational meeting of the Geometry Working Seminar on Tuesday, January 7, 2020, at 11:00 am in MC 5413.
Dimitris Koukoulopoulos, Université de Montréal
"Approximating reals by rationals"
Andrej Vukovic, Department of Pure Mathematics, University of Waterloo
This week, we continue our study of topological quantum field theories by discussing Morse theory and introducing the notion of cobordism.
MC 5417
Wilson Poulter, Department of Pure Mathematics, University of Waterloo
"NIP IX, take 2"
We continue section 3.2 of Simon's Guide to NIP theories.
M3 3103