Kyle M. Ormsby, Ph.D.
Affiliations: | 2010 | University of Michigan, Ann Arbor, Ann Arbor, MI |
Area:
MathematicsGoogle:
"Kyle Ormsby"Parents
Sign in to add mentor| Igor Kriz | grad student | 2010 | University of Michigan | |
| (Computations in stable motivic homotopy theory.) | ||||
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Publications
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| Ormsby K, Röndigs O. (2020) The homotopy groups of the η-periodic motivic sphere spectrum Pacific Journal of Mathematics. 306: 679-697 |
| Behrens M, Ormsby K, Stapleton N, et al. (2019) On the ring of cooperations for 2‐primary connective topological modular forms Journal of Topology. 12: 577-657 |
| Heller JB, Ormsby KM. (2018) Primes and fields in stable motivic homotopy theory Geometry & Topology. 22: 2187-2218 |
| Ormsby K, Röndigs O, Østvær PA. (2018) Vanishing In Stable Motivic Homotopy Sheaves Forum of Mathematics, Sigma. 6 |
| Heller J, Ormsby K. (2016) Galois equivariance and stable motivic homotopy theory Transactions of the American Mathematical Society. 368: 8047-8077 |
| Ormsby KM, Østvær PA. (2014) Stable motivic π1 of low-dimensional fields Advances in Mathematics. 265: 97-131 |
| Ormsby KM, Østvær PA. (2013) Motivic Brown-Peterson invariants of the rationals Geometry and Topology. 17: 1671-1706 |
| Ormsby KM. (2011) Motivic invariants of p-adic fields Journal of K-Theory. 7: 597-618 |
| Hu P, Kriz I, Ormsby K. (2011) Convergence of the motivic adams spectral sequence Journal of K-Theory. 7: 573-596 |
| Hu P, Kriz I, Ormsby K. (2011) Remarks on motivic homotopy theory over algebraically closed fields Journal of K-Theory. 7: 55-89 |