My Research Life
The Research
I consider myself an algebraic topologist!
In this area, I am interested in studying operads and there many applications and uses.
Right now, I am looking for ways to use Elmendorf's Theorem in the spirit of Mandell on this paper. More generally I am interested in finding coalgebraic models for equivariant spaces.
Below are some papers I have on the arXiv (most recent first):
Below are some notes I have written (most recent first):
- I compiled each document below every semester since passing my oral advanced topics exam summarizing concepts I have understood and related to my dissertation topic.
Below are some talks I have given (most recent first):
Coalgebraic Models of for G-Spaces at the Joint Mathematics Meetings 2024
Equivariantly Equivalent (According to Elmendorf) at the University of Washington for USTARS 2023
The Algebraic Structure of Loop Spaces at JMM 2023 in the AMS EDGE Session
Understanding the Elmendorf Construction at eCHT for the Fall 2022 Kan Seminar
Algebraic Azaleas: the Algebraic Structure of Loop Spaces at the University of Oxford for the EDGE 2022 Mentor Colloquium
Let's Talk Alge Top at Spelman College for the EDGE 2022 Symposium
The People
This is what my academic family looks like and I am grateful to be apart of it!