The Weil-Moore anima refines the Weil group into a space with higher homotopy groups to improve its cohomological behavior for number fields.
B(G) for all local and global fields
3 Pith papers cite this work. Polarity classification is still indexing.
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abstract
Generalizing earlier results concerning p-adic fields, this paper develops a theory of B(G) for all local and global fields.
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Introduces p-adic Hodge structures equivalent to admissible pairs and characterizes CM cases by transcendence of de Rham periods, generalizing prior one-dimensional results unconditionally.
Orbital integrals on unitary groups over local fields in positive characteristic converge absolutely.
citing papers explorer
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Weil-Moore anima
The Weil-Moore anima refines the Weil group into a space with higher homotopy groups to improve its cohomological behavior for number fields.
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Admissible pairs and $p$-adic Hodge structures I: Transcendence of the de Rham lattice
Introduces p-adic Hodge structures equivalent to admissible pairs and characterizes CM cases by transcendence of de Rham periods, generalizing prior one-dimensional results unconditionally.
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Convergence of orbital integrals on unitary groups in positive characteristic
Orbital integrals on unitary groups over local fields in positive characteristic converge absolutely.