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Jo Ellis-Monaghan

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Joanna Anthony Ellis-Monaghan is an American mathematician and mathematics educator whose research interests include graph polynomials and topological graph theory. She is a professor of mathematics at the Korteweg-de Vries Institute for Mathematics of the University of Amsterdam.

Education and career

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Ellis-Monaghan grew up in Alaska.[1] She graduated from Bennington College in 1984 with a double major in mathematics and studio art, and earned a master's degree in mathematics from the University of Vermont in 1986. After beginning a doctoral program at Dartmouth College, she transferred to the University of North Carolina at Chapel Hill, where she completed her Ph.D. in 1995.[2] Her dissertation, supervised by Jim Stasheff, was A unique, universal graph polynomial and its Hopf algebraic properties, with applications to the Martin polynomial.[2][3]

She joined the Saint Michael's College faculty in 1992,[2] chaired the department there,[1] and has also held positions at the University of Vermont.[2] In 2020, she became professor of Discrete Mathematics at the University of Amsterdam.[4] From 2010-2020, she served as a subject editor of PRIMUS, a journal on the teaching of undergraduate mathematics.[5]

Bibliography

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  • With Iain Moffat, Ellis-Monaghan is the author of the book Graphs on Surfaces.[6][7]

References

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  1. ^ a b "Jo Ellis-Monaghan, PhD: Mathematics Department Chair, Professor of Mathematics", Get to Know Us, Saint Michael's College, archived from the original on 2017-12-10, retrieved 2017-12-10
  2. ^ a b c d Curriculum vitae, 2013, archived from the original on 2018-02-02, retrieved 2017-12-10
  3. ^ Jo Ellis-Monaghan at the Mathematics Genealogy Project
  4. ^ Joanna Ellis-Monaghan appointed professor of Discrete Mathematics, University of Amsterdam, 1 October 2020, retrieved 2020-12-18
  5. ^ "Editorial board", PRIMUS, Taylor & Francis, retrieved 2017-12-10
  6. ^ Reviews of Graphs on Surfaces:
  7. ^ Graphs on Surfaces. New York: Springer. 27 June 2013. ISBN 978-1-4614-6970-4. OCLC 859157796.
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