Results 291 to 300 of about 3,782,951 (354)
VeloxChem Quantum-Classical Interoperability for Modeling of Complex Molecular Systems. [PDF]
J Phys Chem Ade Gracia Triviño JA +11 more
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Three-torsion subgroups and wild conductor exponents of plane quartics. [PDF]
Res Number TheoryLupoian E, Rawson J.
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The nature of phantom dark energy and its relation to time crystals. [PDF]
Sci RepMersini-Houghton L.
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Henselian Discrete Valued Fields Admitting One-Dimensional Local Class Field Theory
, 2004 Ivan D. Chipchakov
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Algebraic Geometry Codes: Advanced
Chapters, 2019
These notes are the result of my study of class field theory in a reading project under the supervision of Mark Kisin. This project was supported by summer 2019 HCRP (Harvard College Research Program) funding.
K. Kallal
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These notes are the result of my study of class field theory in a reading project under the supervision of Mark Kisin. This project was supported by summer 2019 HCRP (Harvard College Research Program) funding.
K. Kallal
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The Annals of Mathematics, 1950
Local class field theory is treated by means of cohomology theory. Let \(L/K\) be a Galois extension with Galois group \(\mathfrak L\). Let \(\mathfrak H\) be an invariant subgroup of \(\mathfrak L\), and \(F\) be the corresponding subfield of \(L\). The lifting \(\lambda\) of the Galois 2-cohomology group \(H^2(\mathfrak L/\mathfrak H, F^*)\) \((F^*\)
G. Hochschild
semanticscholar +4 more sources
Local class field theory is treated by means of cohomology theory. Let \(L/K\) be a Galois extension with Galois group \(\mathfrak L\). Let \(\mathfrak H\) be an invariant subgroup of \(\mathfrak L\), and \(F\) be the corresponding subfield of \(L\). The lifting \(\lambda\) of the Galois 2-cohomology group \(H^2(\mathfrak L/\mathfrak H, F^*)\) \((F^*\)
G. Hochschild
semanticscholar +4 more sources
2003
Global class field theory is a major achievement of algebraic number theory, based on the Artin reciprocity map and the existence theorem. The author works out the consequences and the practical use of these results by giving detailed studies and illustrations of classical subjects (classes, idèles, ray class fields, symbols, reciprocity laws, Hasse's ...
Georges Gras
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Global class field theory is a major achievement of algebraic number theory, based on the Artin reciprocity map and the existence theorem. The author works out the consequences and the practical use of these results by giving detailed studies and illustrations of classical subjects (classes, idèles, ray class fields, symbols, reciprocity laws, Hasse's ...
Georges Gras
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1979
Standard local class field theory is concerned with complete fields K whose residue field is finite.
Jean-Pierre Serre
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Standard local class field theory is concerned with complete fields K whose residue field is finite.
Jean-Pierre Serre
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