• Enjoy Deloop4, a follow-up to Deloop3!
  This episode is on geometric models for infinite loop spaces of motivic Thom spectra that were computed previously. 
  
  
• A shortened version of my thesis on The unit map of MSL is finally on arxiv! 
  
  
• I will give a talk on 29th February in the Southern California Algebraic Geometry Seminar in San Diego
  and on 27th February in the Seminar on Geometry and Arithmetic in Santa Barbara University. 

Title: The motive of the Hilbert scheme of infinite affine space
Abstract: The Hilbert schemes (of points) of surfaces have many nice properties, however they are hard to study for higher dimensional schemes. In particular the Hilbert scheme of the two-dimensional affine space has a pure Tate motive, but we don’t know the motives of Hilbert schemes of Aⁿ for higher n. Surprisingly, we observe that the ind-scheme Hilb(A^∞) has a pure Tate motive, at least rationally. Moreover, if we let both the dimension of affine space and the degree of points go to infinity, we get that colim_d Hilb_d(A^∞) is A¹-homotopy equivalent to the infinite Grassmanian, which has a well-known pure Tate motive thanks to its cellular structure. Time permitting, we will discuss applications of this result to algebraic K-theory and its version for hermitian K-theory. This is joint work with Marc Hoyois, Joachim Jelisiejew, and Denis Nardin.

• On 2nd March I will give a talk in the Algebra seminar in USC, Los Angeles. 

Title: Motivic generalized cohomology theories from framed perspective
Abstract: All motivic generalized cohomology theories acquire unique structure of so called framed transfers. If one takes framed transfers into account, it turns out that many interesting cohomology theories can be constructed simply as suspension spectra on certain moduli stacks (and their variations). This way important cohomology theories on schemes get new geometric interpretations, and so do  canonical maps between different cohomology theories. In the talk we will explain the general formalism of framed transfers and show how it works for various cohomology theories. This is a summary of joint projects with Tom Bachmann, Elden Elmanto, Marc Hoyois, Joachim Jelisiejew, Adeel Khan, Denis Nardin and Vladimir Sosnilo.

• During 16 March - 10 April I will take part in the program "K-theory, algebraic cycles and motivic homotopy theory" at INI.
  
  
• During 10 February - 6 March I will be a research member of the program "Higher Categories and Categorification" at MSRI.
  
  
• ICM 2022 will happen in St. Petersburg, with visa-free entry for all participants!