Torsion higher Chow cycles modulo

Abstract

We study the injectivity property of certain actions of higher Chow groups on refined unramified cohomology. As an application for every p≥1 and for each d≥ p+4 and n≥2, we establish the first examples of smooth complex projective d-folds X such that for all p+3≤ c≤ d-1, the higher Chow group CHc(X,p) contains infinitely many torsion cycles of order n that remain linearly independent modulo n. Our bounds for c and d are also optimal. A crucial tool for the proof is morphic cohomology.

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