In 1964, Lesley Sibner became an instructor at Stanford University for two years. She was a Fulbright Scholar at the Institut Henri Poincaré in Paris the following year. At this time, in addition to solo work on the Tricomi equation and compressible flows, she began working with her husband Robert Sibner on a problem suggested by Lipman Bers: do there exists compressible flows on a Riemann surface? As part of her work in this direction, she studied differential geometry and Hodge theory eventually proving a nonlinear Hodge–DeRham theorem with Robert Sibner based on a physical interpretation of one-dimensional harmonic forms on closed manifolds. The techniques are related to her prior work on compressible flows. They kept working together on related problems and applications of this important work for many years.[3]
Karen Uhlenbeck suggested that Lesley Sibner work on Yang-Mills equation. In 1979-1980 she visited Harvard University where she learned gauge field theory from Clifford Taubes. This lead results about point singularities in the Yang-Mills equation and the Yang–Mills–Higgs equations. Her interest in singularities soon brought her deeper into geometry, leading to a classification of singular connections and to a condition for removing two-dimensional singularities in work with Robert Sibner.[3]
Realizing that instantons could under certain circumstances be viewed as monopoles, the Sibners and Uhlenbeck constructed non-minimal unstable critical points of the Yang-Mills functional over the four-sphere in 1989. She was invited to present this work at the Geometry Festival. She was a Bunting Scholar at the Radcliffe Institute for Advanced Study in 1991. For the subsequent decades, Lesley Sibner focussed on gauge theory and gravitational instantons. Although the research sounds very physical, in fact throughout her career, Lesley Sibner applied physical intuition to prove important geometric and topological theorems.
Sibner, L. M.; Sibner, R. J. (1974). "A constructive proof of the Riemann-Roch theorem for curves". Contributions to analysis (a collection of papers dedicated to Lipman Bers). New York: Academic Press. pp. 401–405.
Sibner, L. M. (1986). "On removable point singularities of coupled Yang–Mills fields". Nonlinear functional analysis and its applications, Part 2 (Berkeley, Calif., 1983). Proceedings of Symposia in Pure Mathematics. Vol. 45. Providence, RI: American Mathematical Society. pp. 371–375..