Federico Binda: Towards a motivic homotopy theory without A1 invariance

The lecture was held within the framework of the Hausdorff Trimester Program: K-Theory and Related Fields.

Federico Binda: Towards a motivic (homotopy) theory without A1-invariance

Abstract:
Motivic homotopy theory as conceived by Morel and Voevodsky is based on the crucial observation that the affine line A1 plays in algebraic geometry the role of the unit interval in algebraic topology. Following the work of Kahn-Saito-Yamazaki, we constructed an unstable motivic homotopy category "with modulus", where the affine line is no longer contractible. In the talk, we will sketch this construction and we will explain why this category can be seen as a candidate environment for studying representability problems for non A1-invariant generalized cohomology theories.