On the p-primary and p-adic cases of the Isotropy Conjecture
Abstract
The purpose of this note is to show that, in contrast to the Fp-case (proven in [7]), the p-primary and p-adic cases of the Isotropy Conjecture, claiming that the isotropic Chow groups with Z/pr, r>1, respectively, with Zp-coefficients over a flexible field coincide with the numerical ones, don't hold. We show that the BP-theory with I(∞)-primary, respectively, I(∞)-adic coefficients may serve as a regular substitute for p-primary, respectively, p-adic Chow groups, which permits to extend the results of [6] to arbitrary primes.
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