TY - BOOK
T1 - The Fourier-Analytic Proof of Quadratic Reciprocity
AU - Berg, Michael
N1 - Berg, Michael C. The Fourier-Analytic Proof of Quadratic Reciprocity. New York: Wiley, 2000
PY - 2000
Y1 - 2000
N2 - "The relative quadratic case was first settled by Hecke in 1923, then recast by Weil in 1964 into the language of unitary group representations. The analytic proof of the general n-th order case is still an open problem today, going back to the end of Heckes famous treatise of 1923. The Fourier-Analytic Proof of Quadratic Reciprocity provides number theorists interested in analytic methods applied to reciprocity laws with a unique opportunity to explore the works of Hecke, Weil, and Kubota."
AB - "The relative quadratic case was first settled by Hecke in 1923, then recast by Weil in 1964 into the language of unitary group representations. The analytic proof of the general n-th order case is still an open problem today, going back to the end of Heckes famous treatise of 1923. The Fourier-Analytic Proof of Quadratic Reciprocity provides number theorists interested in analytic methods applied to reciprocity laws with a unique opportunity to explore the works of Hecke, Weil, and Kubota."
KW - reciprocity theorems
UR - https://digitalcommons.lmu.edu/math_fac/56
M3 - Book
BT - The Fourier-Analytic Proof of Quadratic Reciprocity
PB - Wiley
ER -