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Hello! I am a graduate student at Stanford University studying at the Institute for Computational and Mathematical Engineering (ICME). There are many research subjects that I find fascinating, some of which include representation theory, abstract algebra (broadly), combinatorics, probability, and graph theory. Currently, I can be found writing proofs, making origami, and LaTeX-ing everything within reach.
Prior to graduate school, I worked as a software developer at Sitka Technology Group in Portland, OR for approximately one year. During that time, I was involved with Portland's chapter of Girl Develop It (Volunteer Director) and PyLadies PDX — groups that encourage women and other underrepresented minorities in technology by providing programming courses, lectures, workshops, and conferences in accepting and affirmative environments.
In 2014, I graduated from the mathematics department at Reed College. My senior thesis examined principal series representations of GL(2) with methods that scale-up to representations of more complicated spaces. This work was heavily indebted to the work of my advisor Jerry Shurman at Reed College and his teacher and close associate Paul Garrett at the University of Minnesota.
My group paper on robust graph ideals was accepted to the Annals of Combinatorics and is available through Springer here. For more information about my work, click on the "Research" tab. Also, feel free to contact me directly (lymanla AT stanford DOT edu) with specific questions.
Prior to graduate school, I worked as a software developer at Sitka Technology Group in Portland, OR for approximately one year. During that time, I was involved with Portland's chapter of Girl Develop It (Volunteer Director) and PyLadies PDX — groups that encourage women and other underrepresented minorities in technology by providing programming courses, lectures, workshops, and conferences in accepting and affirmative environments.
In 2014, I graduated from the mathematics department at Reed College. My senior thesis examined principal series representations of GL(2) with methods that scale-up to representations of more complicated spaces. This work was heavily indebted to the work of my advisor Jerry Shurman at Reed College and his teacher and close associate Paul Garrett at the University of Minnesota.
My group paper on robust graph ideals was accepted to the Annals of Combinatorics and is available through Springer here. For more information about my work, click on the "Research" tab. Also, feel free to contact me directly (lymanla AT stanford DOT edu) with specific questions.