On class groups of imaginary quadratic fields

Andrew Wiles

Type: Article

Publication Date: 2015-08-14

Citations: 16

DOI: https://doi.org/10.1112/jlms/jdv031

Abstract

In this paper, it is proved that one can find imaginary quadratic fields with class number not divisible by a specified prime l and with certain specified splitting conditions at a finite number of primes. Such existence theorems are useful in the arithmetic of elliptic curves and, potentially, also in certain lifting problems for reducible two-dimensional Galois representations. The methods used are a blend of geometry and the theory of modular forms, especially the trace formula.

Locations

Journal of the London Mathematical Society - View
Oxford University Research Archive (ORA) (University of Oxford) - View - PDF

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Works Cited by This (11)

Action	Title	Year	Authors
+ PDF Chat	Arithmétique des Algèbres de Quaternions	1980	Marie-France Vignéras
+	Trace formulae and imaginary quadratic fields	1990	Kuniaki Horie
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+	Proof of the existence of infinitely many imaginary quadratic fields whose class number is not divisible by 3	1974	P. Hartung
+	Canonical periods and congruence formulae	1999	Vinayak Vatsal
+	Residually reducible representations and modular forms	1999	Christopher Skinner Andrew Wiles
+	Nonvanishing modulo ℓ of Fourier coefficients of half-integral weight modular forms	1999	Jan Hendrik Bruinier
+ PDF Chat	Automorphic Forms on GL (2)	1970	H. Jacquet R. P. Langlands
+ PDF Chat	On the Davenport–Heilbronn theorems and second order terms	2012	Manjul Bhargava Arul Shankar Jacob Tsimerman
+ PDF Chat	Heuristics on class groups of number fields	1984	Henri Cohen H. W. Lenstra