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We investigate when the filtration induced by Beilinson's spectral sequence splits non-canonically into a direct sum decomposition. We conclude that for any vector bundle E on a projective space over an algebraically closed field of characteristic p>0 there exists r₀ such that for r r₀ the Frobenius pushforward F^r*E decomposes as a direct sum of line bundles and exterior powers of the cotangent bundle (we also give a variant for the "toric Frobenius map" valid in any characteristic). As an application we give a short proof of Klyachko's theorem for vanishing of the cohomology of toric vector bundles on projective spaces.
Feliks Rączka (Mon,) studied this question.