Vector bundles over certain Koras-Russell threefolds of the third kind
Abstract
Let k be an algebraically closed base field of characteristic 0 and let α1, α2, α3, d ≥ 2 be integers such that α1, α2, α3 are pairwise coprime and gcd (α1,d-1) = 1. Then consider the Koras-Russell threefold Y := \ x + xd yα1 + zα2 + tα3 = 0\ ⊂ A4k. We prove that the Chow groups CHi(Y) are trivial for i=1,2,3 and therefore all algebraic vector bundles over Y are trivial. If α1 is odd, we also prove that the Chow-Witt groups CHi(Y, L) are trivial for i=1,2,3 and any line bundle L over Y.
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