• ICM 2022 will happen in St. Petersburg, with visa-free entry for all participants!
  
  
• Tom Bachmann will report on our joint work in progress during the conference "Motives in St Petersburg".

Title: From strictly homotopy invariant sheaves to effective homotopy modules 
Abstract: Let SH^S1(k) and SH(k) denote the motivic S¹- and P¹-stable homotopy categories, respectively. They are related by the
Gm-stabilization adjunction SH^S1(k) <-> SH(k). Following Levine-Voevodsky, this adjunction can be factored further as

SH^S1(k) <-> SH^S1(k)(1) <-> ... <-> SH(k).

Each of the above categories has a t-structure, and all of the adjunctions are compatible with the t-structures
(i.e. the left adjoints are right-t-exact). In studying the effect of Gm-stabilization on the hearts, we are lead to the following

Conjecture: the functor SH(k)^♥ -> SH^S1(k)(n)^♥ is an equivalence for n > 0.

Using the theory of framed transfers and the homotopy coniveau tower, we provide two pieces of evidence for this conjecture:
(1) the functor is fully faithful, and (2) if M is a strictly homotopy invariant sheaf, then M_-2 is an effective homotopy module.

• On 6th July I gave a talk in the SFB-Seminar at Regensburg University.

Title: Motivic stable homotopy groups via framed correspondences
Abstract: A modern approach to the motivic stable homotopy category allows one to express its mapping spaces in terms of geometric data called "framed correspondences". We will explain this approach and illustrate it by computing Gm-homotopy groups of the special linear algebraic cobordism spectrum MSL. 

• On 25-29 June I will be participating in Homotopy Theory Summer in Berlin.
  
  
• On 13-17 August I will attend Equivariant and motivic homotopy theory in Cambridge.
  
  
• On 3-14 September I will be enjoying Motives in St. Petersburg!