Uniform vector bundles over P4
Abstract
There is a long-standing conjecture which states that every uniform algebraic vector bundle of rank r<2n on the n-dimensional projective space Pn over an algebraically closed field of characteristic 0 is homogeneous. This conjecture is valid for n≤3. In this paper, we classify all uniform vector bundles of rank r<8 over P4 and show that the conjecture holds for n=4.
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