Filtrations of relative units in the cyclotomic \(\mathbb{Z}_p\)-extension of \(\mathbb{Q}\)
From MaRDI portal
Publication:6655069
Publication date: 20 December 2024
Published in: Journal of the Ramanujan Mathematical Society (Search for Journal in Brave)
Cites Work
- Title not available (Why is that?)
- Title not available (Why is that?)
- Title not available (Why is that?)
- Mahler measure and Weber's class number problem in the cyclotomic \(\mathbb Z_p\)-extension of \(\mathbb Q\) for odd prime number \(p\)
- Height and Weber's class number problem
- Weber's class number problem in the cyclotomic \(\mathbb Z_2\)-extension of \(\mathbb Q\). II.
- On the 2-part of the class numbers of cyclotomic fields of prime power conductors
- A note on class numbers of algebraic number fields
- The ideal class group of the basic \(\mathbb Z_p\)-extension over an imaginary quadratic field
- Primary components of the ideal class group of the \(\mathbb Z_p\)-extension over \(\mathbb Q\) for typical inert primes
- The ideal class group of the \(\mathbb Z_p\)-extension over the rationals
- The narrow class groups of the \(\mathbb Z_{17}\)- and \(\mathbb Z_{19}\)-extensions over the rational field
- The theory of the abelian number fields.
- The \(l\)-class group of the \(\mathbb Z_p\)-extension over the rational field
- The ideal class group of the \(Z_{23}\)-extension over the rational field
- Certain primary components of the ideal class group of the \(\mathbb Z_p\)-extension over the rationals
- Numerische Bestimmung von Klassenzahlen reeller zyklischer Zahlkörper
- A numerical study of Weber's real class number calculation
- Class numbers of totally real fields and applications to the Weber class number problem
- Ideal Class Groups of Iwasawa-Theoretical Abelian Extensions Over the Rational Field
- WEBER'S CLASS NUMBER PROBLEM IN THE CYCLOTOMIC ℤ2-EXTENSION OF ℚ, III
- Mahler measure of the Horie unit and Weber's class number problem in the cyclotomic Z3-extension of Q
- The narrow class groups of some Zp-extensions over the rationals
- Weber's Class Number Problem in the Cyclotomic ℤ2-Extension of ℚ
- Class Number Computations of Real Abelian Number Fields
- Filtrations of units of Viète field
- On the Class Numbers in the Cyclotomic Z29- and Z31-Extensions of the Field of Rationals
This page was built for publication: Filtrations of relative units in the cyclotomic \(\mathbb{Z}_p\)-extension of \(\mathbb{Q}\)
Report a bug (only for logged in users!)Click here to report a bug for this page (MaRDI item Q6655069)
