Contact Information
323 Illini Hall, MC-382
1409 W. Green Street
Urbana, IL 61801
Research Areas
Research Description
My research is in stable homotopy theory, and mostly revolves around topological modular forms, duality, or both. I also have a growing interest in the application of homotopy theory to studying obstructions for the existence of rational points on varieties.
Education
PhD Mathematics, Northwestern University, 2011
Awards and Honors
Fellow, Center for Advanced Study, University of Illinois, 2018-2019
External Links
Recent Publications
Barthel, T., Beaudry, A., & Stojanoska, V. (2019). Gross–Hopkins duals of higher real K–theory spectra. Transactions of the American Mathematical Society, 372(5), 3347-3368. https://doi.org/10.1090/tran/7730
Behrens, M., Ormsby, K., Stapleton, N., & Stojanoska, V. (2019). On the ring of cooperations for 2-primary connective topological modular forms. Journal of Topology, 12(2), 577-657. https://doi.org/10.1112/topo.12094
Bergner, J. E., Joachimi, R., Lesh, K., Stojanoska, V., & Wickelgren, K. (2019). Classification of problematic subgroups of U(n). Transactions of the American Mathematical Society, 371(10), 6739-6777. https://doi.org/10.1090/tran/7442
Beaudry, A., Hess, K., Kȩdziorek, M., Merling, M., & Stojanoska, V. (2018). Motivic homotopical Galois extensions. Topology and its Applications, 235, 290-338. https://doi.org/10.1016/j.topol.2017.12.006
Davis, R., Pries, R., Stojanoska, V., & Wickelgren, K. (2018). The Galois action and cohomology of a relative homology group of Fermat curves. Journal of Algebra, 505, 33-69. https://doi.org/10.1016/j.jalgebra.2018.02.021