Tied Up In Knots
Posted on December 7, 2021
When Dr. Christine Ruey Shan Lee explains her research in knot theory, she likes to bring along visual aids.
Sometimes they鈥檙e edible.
鈥淚 say that I study shapes,鈥 said Lee, an assistant professor of mathematics at the 麻豆传媒. 鈥淩ecently, I gave a colloquium talk about the shape of the universe, and that seemed to work with students. I also brought in donuts, because in topology a donut鈥檚 the same shape as a coffee cup. If you imagine they鈥檙e made of stretchy material, like Play-Doh, they鈥檙e the same. 鈥 It鈥檚 also a great excuse to bring in donuts.鈥
Lee, 36, has the easy laugh of someone who enjoys working with people. She can鈥檛 imagine being a mathematician without teaching undergraduates or guiding graduate students.
鈥淚 need some connection,鈥 she said. 鈥淓very class is different and every student is different. And it鈥檚 very interesting to have someone to study a problem with. Every time I face a new problem, it鈥檚 the same. I feel like I鈥檓 learning along with the students.鈥
Lee still works with Dr. Effie Kalfagianni, her mentor at Michigan State University, where she earned her Ph.D. in mathematics. They share ideas, questions and problems with colleagues from Georgia Tech to the University of Iowa, along with researchers in Australia and the Netherlands.
鈥淢athematicians are actually very collaborative,鈥 she said. 鈥淚 enjoy that aspect. We talk to people all the time. We Zoom, we Skype, or we meet at conferences.鈥
The field of topology considers the properties of geometric objects that are unaffected by change in size or shape. It is sometimes called 鈥渞ubber sheet geometry,鈥 because objects can be stretched and contracted, but not broken. For non-mathematicians, drawings are helpful, because descriptions of this work soon grow dense.
In knot theory, mathematicians study closed loops in a three-dimensional space. Knots that cannot be transformed into one another are considered different, or inequivalent. Key tools for distinguishing these knots are called invariants. An important knot invariant, the colored Jones polynomial, lies at the heart of quantum topology, low-dimensional topology and hyperbolic geometry.
Lee has contributed to journal articles such as 鈥淭he slope conjecture for Montesinos knots,鈥 in the International Journal of Mathematics, and 鈥淪tability and triviality of the transverse invariant from Khovanov homology,鈥 in Topology and Its Applications.
Her work is pure mathematics, though there are applications in quantum physics and other fields. Companies such as Microsoft employ mathematicians in her area for research on quantum computing.
Lee鈥檚 most recent research continues work funded by a $109,000 grant from the National Science Foundation. She鈥檚 exploring the relationship between quantum knot invariants, a relatively less understood family, constructed from the ideas of quantum physics and mathematics. The grant served as confirmation and support for her research.
鈥淭his was huge,鈥 she said. 鈥淚鈥檝e been thinking about this since I was a graduate student. Writing a proposal is like a promise of what you鈥檙e going to do. That鈥檚 great, but I always feel a lot of responsibility.鈥
Dr. Madhuri Mulekar, chair of the department of mathematics and statistics at South, called Lee鈥檚 NSF grant a great accomplishment. 鈥淲e鈥檙e lucky to have her,鈥 she said. 鈥淪he鈥檚 a great addition to our department.鈥
Mulekar happened to attend Lee鈥檚 recent talk with students 鈥 the one with the donuts.
鈥淚t was wonderful,鈥 she said. 鈥淪he鈥檚 a really in-demand teacher. I see students coming up to her and asking questions all the time. She鈥檚 very patient and fun to talk with.鈥
At Michigan State, Kalfagianni remembers working on two papers with Lee while her student was busy writing her dissertation. They met weekly and always ended up talking longer than they'd planned.
"Dr. Lee鈥檚 work has matured and broadened its scope over the years," Kalfagianni said. "She is doing important work at the interface of Jones-type quantum invariants and classical knot theory, where she has firmly established herself as an expert. I often write to her when I have questions or thoughts in this area, and she is always helpful.鈥
鈥業t鈥檚 Knot What You Think鈥
Lee鈥檚 office at South has a view of oaks and pines, but most of her shelves are bare. A chalkboard facing her desk is covered with equations from a problem she鈥檚 working on with a graduate student.
There are a few posters on her walls.
鈥淢athematical Research 鈥 It鈥檚 knot what you think,鈥 reads the copy of one poster from the American Mathematical Society. 鈥淭hat is, mathematical research is not adding, multiplying and dividing big numbers. It is asking questions, on subjects ranging from how proteins fold to the shape of the universe, answering those questions by finding patterns or unifying principles, and proving that the answers are valid.鈥
A filing cabinet in one corner holds a few pieces of origami, along with a 3-D printed model of a topological construct called a Klein bottle.
鈥淚t鈥檚 a non-orientable surface,鈥 Lee explained. 鈥淚t doesn鈥檛 have an inside or outside.鈥
Finally, next to her desk, there鈥檚 a hand-colored folding sign for weekly meetings of Girls Who Code, a computer organization for middle school students. The group at South was started by Dr. Selvi Kara, who was a colleague in the math department.
Her NSF grant also funds community outreach programs. It鈥檚 another kind of connection.
鈥淲e meet once a week and we code,鈥 Lee said. 鈥淚t鈥檚 a lot of fun. It鈥檚 more fun in person, I think, because you can see their faces.鈥
Southern California to South Alabama
Lee grew up in a Taiwanese-American family in Alhambra, California, just outside Los Angeles. Her father was a physician. He expected his daughter to become a physician, too.
Instead, Lee began a career in mathematics at the California Institute of Technology.
鈥淚t just appealed to me,鈥 she said. 鈥淭he way you can make arguments visually. It鈥檚 beautiful. Mathematicians, when we say something鈥檚 beautiful, it doesn鈥檛 always convey what we mean. The fact that there鈥檚 this deep relationship between the things we study, that鈥檚 very beautiful to us.鈥
Her parents didn鈥檛 share her preference for math over medicine 鈥 鈥渢hat was pretty traumatic for them鈥 鈥 but felt better when she earned her doctorate at Michigan State. (And one of her younger brothers did become a physician.) Lee did post-doctoral research at the University of Texas before joining the faculty at the 麻豆传媒 in 2018.
In Mobile, Lee lives in Midtown, and enjoys a short commute to campus. She says she doesn鈥檛 really have any hobbies or side interests. Research is her focus.
鈥淚t takes so much effort just to be a mathematician, at least for me,鈥 she said. 鈥淚鈥檒l be doing the dishes, thinking about this proof, or something I just read.鈥
When pressed, Lee will admit to binge-watching television series. Right now, it鈥檚 a cold war drama, 鈥淭he Americans.鈥 She鈥檚 usually a few years behind the times.
鈥淚 don鈥檛 like watching things that haven鈥檛 been concluded,鈥 she said. 鈥淚t鈥檚 too much to think about.鈥
There鈥檚 always something new to think about in knot theory. All she needs is a sheet of paper, for drafting figures, or a laptop computer, for conferring with colleagues.
She comes up with ideas and shares them with others. They respond and she thinks about what comes next.
鈥淚 enjoy mathematics 鈥 I enjoy it very much,鈥 she said. 鈥淓very morning I wake up, and I鈥檓 happy.鈥
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