Comparing A1-h-cobordism and A1-weak equivalence

Abstract

We study the problem of classifying projectivizations of rank-two vector bundles over P2 up to various notions of equivalence that arise naturally in A1-homotopy theory, namely A1-weak equivalence and A1-h-cobordism. First, we classify such varieties up to A1-weak equivalence: over algebraically closed fields having characteristic unequal to two the classification can be given in terms of characteristic classes of the underlying vector bundle. When the base field is C, this classification result can be compared to a corresponding topological result and we find that the algebraic and topological homotopy classifications agree. Second, we study the problem of classifying such varieties up to A1-h-cobordism using techniques of deformation theory. To this end, we establish a deformation rigidity result for P1-bundles over P2 which links A1-h-cobordisms to deformations of the underlying vector bundles. Using results from the deformation theory of vector bundles we show that if X is a P1-bundle over P2 and Y is the projectivization of a direct sum of line bundles on P2, then if X is A1-weakly equivalent to Y, X is also A1-h-cobordant to Y. Finally, we discuss some subtleties inherent in the definition of A1-h-cobordism. We show, for instance, that direct A1-h-cobordism fails to be an equivalence relation.