Nontrivial vector bundles with trivial Chern classes
Abstract
Let F0 be an algebraically closed field, with char( F0)=0. In this article, for prime numbers p≥ 2, we construct smooth affine algebras B over F0, with B=p+2. Further, we construct projective B-modules Q with rank(Q)=p, such that x=[Q] -[Bp]≠ 0 in K0(B) and the total Chern class C(Q)=1+Σi=1pCk(Q) =1 is trivial. We use the splitting theorem in ABH that for projective B-modules P with rank(P)=r= B-1, vanishing Cr(P)=0 P Q B.
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