0000000000281653

AUTHOR

Kenji Koike

showing 1 related works from this author

Quotients of Fermat curves and a Hecke character

2005

AbstractWe explicitly identify infinitely many curves which are quotients of Fermat curves. We show that some of these have simple Jacobians with complex multiplication by a non-cyclotomic field. For a particular case we determine the local zeta functions with two independent methods. The first uses Jacobi sums and the second applies the general theory of complex multiplication, we verify that both methods give the same result.

Fermat's Last TheoremDiscrete mathematicsAlgebra and Number TheoryMathematics::Number TheoryApplied MathematicsGeneral EngineeringComplex multiplicationFermat's theorem on sums of two squaresComplex multiplicationField (mathematics)Wieferich primeFermat's factorization methodHecke characterHecke charactersTheoretical Computer Sciencesymbols.namesakeJacobi sumsSimple (abstract algebra)Fermat curvessymbolsEngineering(all)MathematicsFinite Fields and Their Applications
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