Syntomic cohomology of Morava K-theory
We compute the MU-based syntomic cohomologies, mod $(p,v_1,\cdots,v_{n+1})$, of all $\mathbb{E}_1$-MU-algebra forms of connective Morava K-theory k(n). As qualitative consequences, we deduce the Lichtenbaum--Quillen conjecture, telescope conjecture, and redshift conjecture for the algebraic K-theori...
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| creator | Angelini-Knoll, Gabriel Hahn, Jeremy Wilson, Dylan |
| description | We compute the MU-based syntomic cohomologies, mod $(p,v_1,\cdots,v_{n+1})$,
of all $\mathbb{E}_1$-MU-algebra forms of connective Morava K-theory k(n). As
qualitative consequences, we deduce the Lichtenbaum--Quillen conjecture,
telescope conjecture, and redshift conjecture for the algebraic K-theories of
all $\mathbb{E}_{1}$-$\mathbb{S}$-algebra forms of $(2p^n-2)$-periodic Morava
K-theory. Notably, the motivic spectral sequence computing $\pi_*TC(k(n))_p$ is
concentrated on at most three lines, independently of $n$. |
| doi_str_mv | 10.48550/arxiv.2410.07048 |
| format | Article |
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of all $\mathbb{E}_1$-MU-algebra forms of connective Morava K-theory k(n). As
qualitative consequences, we deduce the Lichtenbaum--Quillen conjecture,
telescope conjecture, and redshift conjecture for the algebraic K-theories of
all $\mathbb{E}_{1}$-$\mathbb{S}$-algebra forms of $(2p^n-2)$-periodic Morava
K-theory. Notably, the motivic spectral sequence computing $\pi_*TC(k(n))_p$ is
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of all $\mathbb{E}_1$-MU-algebra forms of connective Morava K-theory k(n). As
qualitative consequences, we deduce the Lichtenbaum--Quillen conjecture,
telescope conjecture, and redshift conjecture for the algebraic K-theories of
all $\mathbb{E}_{1}$-$\mathbb{S}$-algebra forms of $(2p^n-2)$-periodic Morava
K-theory. Notably, the motivic spectral sequence computing $\pi_*TC(k(n))_p$ is
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of all $\mathbb{E}_1$-MU-algebra forms of connective Morava K-theory k(n). As
qualitative consequences, we deduce the Lichtenbaum--Quillen conjecture,
telescope conjecture, and redshift conjecture for the algebraic K-theories of
all $\mathbb{E}_{1}$-$\mathbb{S}$-algebra forms of $(2p^n-2)$-periodic Morava
K-theory. Notably, the motivic spectral sequence computing $\pi_*TC(k(n))_p$ is
concentrated on at most three lines, independently of $n$.</abstract><doi>10.48550/arxiv.2410.07048</doi><oa>free_for_read</oa></addata></record> |
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| subjects | Mathematics - Algebraic Topology Mathematics - K-Theory and Homology |
| title | Syntomic cohomology of Morava K-theory |
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