Jane Piore Gilman (born 1945) [1] is an American mathematician, a distinguished professor of mathematics at Rutgers University. [2] Her research concerns topology and group theory.
Gilman is one of three children of physicist Emanuel R. Piore. [3] She did her undergraduate studies at the University of Chicago, graduating in 1965, [2] and received her Ph.D. from Columbia University in 1971. Her thesis, supervised by Lipman Bers, was entitled Relative Modular Groups in Teichmüller Spaces. [4] She worked for a year as an instructor at Stony Brook University before joining Rutgers in 1972. [2]
Gilman is the author of a monograph on the problem of testing whether pairs of elements of PSL(2,R) (the group of orientation-preserving isometries of the hyperbolic plane) generate a Fuchsian group (a discrete subgroup of PSL(2,R)). It is Two-generator Discrete Subgroups of PSL(2, R) (Memoirs of the American Mathematical Society 117, 1995). [5] With Irwin Kra and Rubí E. Rodríguez she is the co-author of a graduate-level textbook on complex analysis, Complex Analysis: In the Spirit of Lipman Bers ( Graduate Texts in Mathematics 245, Springer, 2007; 2nd ed., 2013). [6]
In 2014 she was elected as a fellow of the American Mathematical Society "for contributions to topology and group theory, and for service to her department and the larger community." [7]
Jane Piore Gilman (born 1945) [1] is an American mathematician, a distinguished professor of mathematics at Rutgers University. [2] Her research concerns topology and group theory.
Gilman is one of three children of physicist Emanuel R. Piore. [3] She did her undergraduate studies at the University of Chicago, graduating in 1965, [2] and received her Ph.D. from Columbia University in 1971. Her thesis, supervised by Lipman Bers, was entitled Relative Modular Groups in Teichmüller Spaces. [4] She worked for a year as an instructor at Stony Brook University before joining Rutgers in 1972. [2]
Gilman is the author of a monograph on the problem of testing whether pairs of elements of PSL(2,R) (the group of orientation-preserving isometries of the hyperbolic plane) generate a Fuchsian group (a discrete subgroup of PSL(2,R)). It is Two-generator Discrete Subgroups of PSL(2, R) (Memoirs of the American Mathematical Society 117, 1995). [5] With Irwin Kra and Rubí E. Rodríguez she is the co-author of a graduate-level textbook on complex analysis, Complex Analysis: In the Spirit of Lipman Bers ( Graduate Texts in Mathematics 245, Springer, 2007; 2nd ed., 2013). [6]
In 2014 she was elected as a fellow of the American Mathematical Society "for contributions to topology and group theory, and for service to her department and the larger community." [7]