Indestructibility in Set Theory
James Holland (Rutgers University)
Abstract: Set theory often focuses on consistency strength results, classifying strength into a large cardinal hierarchy. But two of the major methods for getting these results rarely play together. The topic of indestructibility for certain large cardinals is one place that the two do interact. I will give an overview of what these methods are, and how they are both used in this context.
mathematical physicsanalysis of PDEsclassical analysis and ODEscategory theorycomplex variablesfunctional analysislogicmetric geometryoptimization and control
Audience: researchers in the topic
VCU ALPS (Analysis, Logic, and Physics Seminar)
Series comments: Description: Research seminar on topics ranging from analysis and logic to mathematical physics.
Meetings will be conducted over Zoom:
Meeting ID: 951 0562 0974
The password is 10 characters, consisting of the name of the ancient Greek mathematician who wrote "Elements" (first letter capitalized) followed by the first 4 primes.
Organizer: | Ihsan Topaloglu* |
Curators: | Marco Aldi*, Brent Cody, Sean D. Cox, Alex Misiats, Allison Moore* |
*contact for this listing |