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): 

• Transplanting Trees: Chromatic Symmetric Function Results through the Group Algebra of $S_n$

• Spiders and their Kin: An Investigation of Stanley's Chromatic Symmetric Function for Spiders and Related Graphs

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. 

• The Surjection Operad

• Advanced Topics Oral Exam Notes

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!