Chern classes from Morava K-theories to pn-typical oriented theories

Abstract

We study non-additive operations from algebraic Morava K-theories to oriented cohomology theories in algebraic geometry. For oriented cohomology theory A that has a pn-typical formal group law over a Z(p)-algebra we construct `Chern classes' from the algebraic n-th Morava K-theory with p-local coefficients to A. If the coefficient ring of A is a free Z(p)-module we also prove that these Chern classes freely generate all operations from K(n) to A. Examples of such theories are algebraic Morava K-theories K(nm)* for all m∈N and Chow groups with p-local coefficients. The universal pn-typical oriented theory is BP\n\* whose coefficient ring is also a free Z(p)-module. Chern classes from the n-th algebraic Morava K-theory K(n) to itself allow us to introduce the gamma filtration on K(n). This is the best approximation to the topological filtration obtained by values of operations and it satisfies properties similar to that of the classical gamma filtration on K0. The major difference from the classical case is that Chern classes from the graded factors griγ K(n)* to Chow groups with p-local coefficients are surjective for i pn, which allows to estimate p-torsion in Chow groups of codimension up to pn of some varieties.