Stable motivic homotopy theory at infinity

Abstract: In this paper, we initiate a study of motivic homotopy theory at infinity. We use the six functor formalism to give an intrinsic definition of the stable motivic homotopy type at infinity of an algebraic variety. Our main computational tools include cdh-descent for normal crossing divisors, Euler classes, Gysin maps, and homotopy purity. Under ℓ-adic realization, the motive at infinity recovers a formula for vanishing cycles due to Rapoport-Zink; similar results hold for Steenbrink's limiting Hodge structures … Show more

“…If X is an fs log scheme proper and log smooth over a scheme, then our cohomology of ∂X is equivalent to the cohomology of the stable homotopy type at infinity of X −∂X defined by Dubouloz-Déglise-Østvaer, compare [12,Remark 3.2.5] and Theorem 4.3.7. We also have a similar result with Wildeshaus' boundary motives, see [28,Proposition 2.4].…”

$\mathbb{A}^1$-homotopy theory of log schemes

“…If X is an fs log scheme proper and log smooth over a scheme, then our cohomology of ∂X is equivalent to the cohomology of the stable homotopy type at infinity of X −∂X defined by Dubouloz-Déglise-Østvaer, compare [12,Remark 3.2.5] and Theorem 4.3.7. We also have a similar result with Wildeshaus' boundary motives, see [28,Proposition 2.4].…”

$\mathbb{A}^1$-homotopy theory of log schemes