Title: Complex motivic $kq$-resolutions
Speaker: Dominic Culver
Speaker Info: University of Illinois Champaign-Urbana
Brief Description:
Special Note:
Abstract:
In the early 80s, Mahowald studied the Adams spectral sequence based on $bo$, the connective cover of real topological $K$-theory. While this spectral sequence doesn’t have a nice description on its $E_2$-term, it is nevertheless computable and useful for chromatic considerations. For example, Mahowald used this spectral sequence to completely determine which elements of the sphere are $v_1$-periodic. In this talk, I will describe some joint work with JD Quigley where we try to carry out Mahowald’s program in the complex motivic world.Date: Monday, October 7, 2019