Polynomials with general C2-fibers are variables. I
Abstract
Suppose that X' is a smooth affine algebraic variety of dimension 3 with H3(X')=0 which is a UFD and whose invertible functions are constants. Suppose that Z is a Zariski open subset of X which has a morphism p : Z -> U into a curve U such that all fibers of p are isomorphic to C2. We prove that X' is isomorphic to C3 iff none of irreducible components of X'-Z has non-isolated singularities. Furthermore, if X' is C3 then p extends to a polynomial on C3 which is linear in a suitable coordinate system. As a consequence we obtain the fact formulated in the title of the paper.
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