A canonical lift of Frobenius in Morava E-theory
classification
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frobeniuscongruentheckemoravaoperatorspaceadamscanonical
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We prove that the $p$th Hecke operator on the Morava $E$-cohomology of a space is congruent to the Frobenius mod $p$. This is a generalization of the fact that the $p$th Adams operation on the complex $K$-theory of a space is congruent to the Frobenius mod $p$. The proof implies that the $p$th Hecke operator may be used to test Rezk's congruence criterion.
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