Associate Professor Artem Pulemotov

Associate Professor

Mathematics
Faculty of Science
a.pulemotov@uq.edu.au
+61 7 336 53270

Overview

Dr Pulemotov holds a Bachelor's degree from Kyiv University and a PhD from Cornell University. His research is in the field of geometric analysis. He was a Dickson Instructor at the University of Chicago before joining the School of Mathematics and Physics at UQ as a lecturer in 2012.

Qualifications

  • Doctor of Philosophy, Cornell University

Publications

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Grants

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Supervision

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Available Projects

  • Several projects are available in the field of geometric analysis. Specific topics include geometric flows, prescribed curvature problems, geometry of Lie groups and homogeneous spaces, Yang-Mills theory, and connections with mathematical physics.

View all Available Projects

Publications

Book Chapter

  • Berezansky, Yurij M. and Pulemotov, Artem (2008). Image of a Jacobi Field. Recent advances in matrix and operator theory. (pp. 47-62) edited by Joseph A. Ball, Yuli. Eidelman, J. William Helton, Vadim Olshevsky and J.ames Rovnyak. Basel, Switzerland: Birkhauser Verlag.

  • Pulemotov, Artem (2004). On the generalized joint eigenvector expansion for commuting normal operators. Current trends in operator theory and its applications. (pp. 517-524) edited by Joseph A. Ball, J. William Helton, Martin Klaus and Leiba Rodman. Basel, Germany: Birkhauser Verlag.

Journal Article

Conference Publication

Grants (Administered at UQ)

PhD and MPhil Supervision

Current Supervision

  • Doctor Philosophy — Associate Advisor

    Other advisors:

Completed Supervision

Possible Research Projects

Note for students: The possible research projects listed on this page may not be comprehensive or up to date. Always feel free to contact the staff for more information, and also with your own research ideas.

  • Several projects are available in the field of geometric analysis. Specific topics include geometric flows, prescribed curvature problems, geometry of Lie groups and homogeneous spaces, Yang-Mills theory, and connections with mathematical physics.