The Stable Equivalence and Cancellation Problems

Abstract

Let K be an arbitrary field of characteristic 0, and n the n-dimensional affine space over K. A well-known cancellation problem asks, given two algebraic varieties V1, V2 ⊂eq n with isomorphic cylinders V1 × 1 and V2 × 1, whether V1 and V2 themselves are isomorphic. In this paper, we focus on a related problem: given two varieties with equivalent (under an automorphism of n+1) cylinders V1 × 1 and V2 × 1, are V1 and V2 equivalent under an automorphism of n? We call this stable equivalence problem. We show that the answer is positive for any two curves V1, V2 ⊂eq 2. For an arbitrary n 2, we consider a special, arguably the most important, case of both problems, where one of the varieties is a hyperplane. We show that a positive solution of the stable equivalence problem in this case implies a positive solution of the cancellation problem.

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