Marie-Louise Michelsohn (born October 8, 1941) is a professor of mathematics at State University of New York at Stony Brook.
Michelsohn attended the Bronx High School of Science. She attended the University of Chicago for her undergraduate and graduate studies, including her PhD.
She spent a year as a visiting professor at University of California at San Diego. She spent a year l'Institut des Hautes Études Scientifiques outside of Paris, France. She then joined the faculty of State University of New York at Stony Brook.
Michelsohn's PhD was in the field of topology. As of 2020, she has published twenty articles, on topics including complex geometry, spin manifolds and the Dirac operator, and the theory of algebraic cycles. Half of her work has been in collaboration with Blaine Lawson. With Lawson, she wrote a textbook on spin geometry which has become the standard reference for the field.
In her most widely-known work, published in 1982, Michelsohn introduced the notion of a balanced metric on a complex manifold. These are hermitian metrics for which the penultimate power of the associated Kähler form is closed, i.e.
d(\underbrace{\omega\wedge … \wedge\omega}n-1times)=0,
Balanced metrics are, in part, of interest due to their role in the Strominger system arising from string theory.
Michelsohn is also an accomplished middle and long-distance runner. She holds five masters athletics world records including through three age divisions of the 2000 metres steeplechase which she has held since 2002.[1] In addition to the world records, she holds 6 more outdoor American records and 10 indoor American records, running the table of all official indoor distances 800 metres and above in both the W65 and W70 divisions.[2]