Relative A1-Contractibility of Smooth Schemes

Abstract

We study smooth morphisms f X S that are A1-contractible in the unstable A1-homotopy category H(S). For base schemes S of finite Krull dimension, we show that A1-contractibility is a fiberwise property: such a morphism is A1-contractible if and only if all its geometric fibers are A1-contractible. We apply this criterion to An-fiber spaces, obtaining a geometric description of their A1-contractibility in terms of local factorizations as towers of torsors under vector bundles, building on results of Asanuma. In low relative dimensions, we establish rigidity results. In relative dimension 1, A1-contractible morphisms over normal bases are precisely Zariski locally trivial A1-bundles. In relative dimension 2, we show that over bases with characteristic zero residue fields, A1-contractible morphisms are A2-fiber spaces, and we obtain Zariski local triviality under additional hypotheses on the base. We also exhibit counterexamples in positive and mixed characteristic and formulate open problems concerning the existence of exotic A1-contractible surfaces.