Contact:
Email: hana [dot] jia [dot] kong [at] gmail [dot] comOffice: Simonyi 026
About:
I am a postdoc member at the IAS 2021-2023.I completed my Ph.D. in Spring 2021 at the University of Chicago, under the supervision of J. Peter May and Dan Isaksen.
My research interest is algebraic topology, with a particular emphasis on motivic and equivariant homotopy theory.
You can find my CV here.
Papers:
Publications:-
A shadow framework for equivariant Hochschild homologies. Accepted by International Mathematics Research Notices.
(with Katharine Adamyk, Teena Gerhardt, Kathryn Hess, Inbar Klang)
[arXiv:2111.04152] - The Chow $t$-structure on on the $\infty$-category of motivic spectra. Annals of Mathematics 195 (2022): 707-773.
(with Tom Bachmann, Guozhen Wang, Zhouli Xu)
[arXiv:2012.02687][journal] - Algebraic slice spectral sequences. Doc. Math. 26 (2021), 1085-1119.
(with Dominic Leon Culver, J.D. Quigley)
[arXiv:2007.08682][journal] - Computational tools for twisted topological Hochschild homology of equivariant spectra.
Topology and its Applications (2022): 108102.
(with Katharine Adamyk, Teena Gerhardt, Kathryn Hess, Inbar Klang)
[arXiv:2001.06602] [journal]
-
$v_1$-periodic motivic homotopy over prime fields
(with J.D. Quigley)
[arXiv:2209.08603] -
Computations of height 2 higher Real $K$-theory spectra at prime 2
(with Zhipeng Duan, Guchuan Li, Yunze Lu, Guozhen Wang)
[arXiv:2209.01830] -
$\mathbb R$-motivic $v_1$-periodic homotopy
(with Eva Belmont, Daniel C. Isaksen)
[arXiv:2204.05937] -
A Toda bracket convergence theorem for multiplicative spectral sequences
(with Eva Belmont)
[arXiv:2112.08689] - The $C_2$-effective spectral sequence for $C_2$-equivariant connective real $K$-theory
[arXiv:2004.00806]
This and that
- This year, I am co-organizing the electronic Computational Homotopy Theory Seminar (eCHT). The seminar is online and meet once per month. Please check the seminar webpage if you are interested.
- My name in Chinese:
. It was taken from Odes of Bin - Book of Poetry.