Relative A1-Contractibility of Smooth Schemes and Exotic Motivic Spheres

Abstract

One of the emerging problems in algebraic geometry is to characterize the affine n-space An among smooth affine schemes up to A1-contractibility. Recent efforts show that this characterization holds in dimensions n<3 over certain fields. In this thesis, we extend this observation to "reasonably" arbitrary base schemes in relative dimensions d<3, exploiting the Zariski local triviality and the triviality of the sheaf of relative differentials. From dimensions n≥ 3, the existence of smooth "exotic" affine schemes - those that are A1-contractible but not isomorphic to the affine n-space - has already been established. A well-studied family constitutes the Koras-Russell threefolds K and their higher-dimensional prototypes Xn, whose A1-contractibility has been so far proven over fields of characteristic zero. Here, we extend the relative A1-contractibility of K and Xn over a Noetherian base scheme in arbitrary dimensions. Then, using these prototypes, we study the existence of "exotic spheres" - n-dimensional smooth schemes that are A1-homotopic, but not isomorphic to An \0\ - in motivic homotopy theory. This result can be seen as the "compact" analog of the study of exotic affine schemes. Our main result shows that in all dimensions n≥ 4, the quasi-affine varieties Xn \\ give a model for the exotic motivic spheres over infinite perfect fields. The novelty is that these constitute the first family of examples of smooth motivic spheres of dimension n, which are not isomorphic to An \0\.

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