Add to ORKGThe class numbers h+ of the real cyclotomic fields are very hard to compute. Methods based on discriminant bounds become useless as the conductor of the field grows and that is why other methods have been developed, which approach the problem from different angles. In this thesis we extend a method of Schoof that was designed for real cyclotomic fields of prime conductor to real cyclotomic fields of conductor equal to the product of two distinct odd primes. Our method calculates the index of a specific group of cyclotomic units in the full group of units of the field. This index has h+ as a factor. We then remove from the index the extra factor that does not come from h+ and so we have the order of h+. We apply our method to real c...
AbstractA unit index-class number formula is proven for “cyclotomic function fields” in analogy with...
AbstractWe obtain a new method for the study of class groups of cyclotomic fields by investigating c...
summary:For any square-free positive integer $m\equiv {10}\pmod {16}$ with $m\geq 26$, we prove that...
Abstract. In this paper, criteria of divisibility of the class number h + of the real cyclotomic fie...
AbstractIn the first part of the paper we show how to construct real cyclotomic fields with large cl...
The determination of the class number of totally real fields of large discriminant is known to be a ...
This thesis is concerned with the unit group and class number of real abelian fields. We study subgr...
Cyclic number fields of odd prime degree are constructed as ray class fields over the rational numbe...
AbstractIn this note we give the results of a computation of class numbers of real cyclic number fie...
Class groups---and their size, the class number---give information about the arithmetic within a fie...
International audienceWe explain how one can use the explicit formulas for the mean square values of...
AbstractLet k be a rational function field over a finite field. Carlitz and Hayes have described a f...
AbstractTo the cyclotomic number fieldKgenerated by the roots of unity of orderfwe attach a Galois m...
Let h + (ℓ n) denote the class number of the maximal totally real subfield Q(cos(2π/ℓ n)) of the fie...
AbstractWe show how to compute the values of h1(p), the first factor of the class number of the cycl...
AbstractA unit index-class number formula is proven for “cyclotomic function fields” in analogy with...
AbstractWe obtain a new method for the study of class groups of cyclotomic fields by investigating c...
summary:For any square-free positive integer $m\equiv {10}\pmod {16}$ with $m\geq 26$, we prove that...
Abstract. In this paper, criteria of divisibility of the class number h + of the real cyclotomic fie...
AbstractIn the first part of the paper we show how to construct real cyclotomic fields with large cl...
The determination of the class number of totally real fields of large discriminant is known to be a ...
This thesis is concerned with the unit group and class number of real abelian fields. We study subgr...
Cyclic number fields of odd prime degree are constructed as ray class fields over the rational numbe...
AbstractIn this note we give the results of a computation of class numbers of real cyclic number fie...
Class groups---and their size, the class number---give information about the arithmetic within a fie...
International audienceWe explain how one can use the explicit formulas for the mean square values of...
AbstractLet k be a rational function field over a finite field. Carlitz and Hayes have described a f...
AbstractTo the cyclotomic number fieldKgenerated by the roots of unity of orderfwe attach a Galois m...
Let h + (ℓ n) denote the class number of the maximal totally real subfield Q(cos(2π/ℓ n)) of the fie...
AbstractWe show how to compute the values of h1(p), the first factor of the class number of the cycl...
AbstractA unit index-class number formula is proven for “cyclotomic function fields” in analogy with...
AbstractWe obtain a new method for the study of class groups of cyclotomic fields by investigating c...
summary:For any square-free positive integer $m\equiv {10}\pmod {16}$ with $m\geq 26$, we prove that...