AbstractWe will give a sufficient condition that λ invariants of real quadratic fields vanish. We will also give some examples
In this paper, we will treat a totally real non-cyclic cubic field k with discriminant 1396 = 22・349...
AbstractLet k be a finite extension of Q and p a prime number. Let K be a Zp-extension of k and S th...
AbstractBy a reduction of analytic formulas it is shown that the μ invariant of the basic Z3-extensi...
AbstractWe will give a sufficient condition that λ invariants of real quadratic fields vanish. We wi...
AbstractLet Q((−m)12) and Q((3m)12) be a pair of quadratic fields, m > 0, and let λ−, μ−; λ+, μ+ be ...
1. Introduction. Let k be a totally real number field. Let p be a fixed prime number and ℤₚ the ring...
"Algebraic Number Theory and Related Topics 2014". December 1~5, 2014. edited by Takeshi Tsuji, Hiro...
AbstractHurwitz-type relations of Iwasawa's λ2−-invariants and the 2-ranks of the “narrow” ideal cla...
AbstractLet k be a J-field, K the basic Zl-extension of k, and A0, A the l-class groups of k, K resp...
AbstractThe Hurwitz type relation of Iwasawa's λ−-invariants in l-extensions of CM-fields is given u...
AbstractLet K be a CM field with K+ its maximal real subfield. Let λ, λ+ be the Iwasawa λ-invariants...
AbstractLet k ⊂ k1 ⊂ … ⊂ K be a Zi-extension. The relations of λ(Kk) and λ(KFF) is studied, where Fk...
AbstractLetkbe a real abelian number field with Galois groupΔandpan odd prime number. Denote byk∞the...
In this paper, we will treat a totally real non-cyclic cubic field k with discriminant 1396 = 22・349...
In this paper, we will treat a totally real non-cyclic cubic field k with discriminant 1396 = 22・349...
In this paper, we will treat a totally real non-cyclic cubic field k with discriminant 1396 = 22・349...
AbstractLet k be a finite extension of Q and p a prime number. Let K be a Zp-extension of k and S th...
AbstractBy a reduction of analytic formulas it is shown that the μ invariant of the basic Z3-extensi...
AbstractWe will give a sufficient condition that λ invariants of real quadratic fields vanish. We wi...
AbstractLet Q((−m)12) and Q((3m)12) be a pair of quadratic fields, m > 0, and let λ−, μ−; λ+, μ+ be ...
1. Introduction. Let k be a totally real number field. Let p be a fixed prime number and ℤₚ the ring...
"Algebraic Number Theory and Related Topics 2014". December 1~5, 2014. edited by Takeshi Tsuji, Hiro...
AbstractHurwitz-type relations of Iwasawa's λ2−-invariants and the 2-ranks of the “narrow” ideal cla...
AbstractLet k be a J-field, K the basic Zl-extension of k, and A0, A the l-class groups of k, K resp...
AbstractThe Hurwitz type relation of Iwasawa's λ−-invariants in l-extensions of CM-fields is given u...
AbstractLet K be a CM field with K+ its maximal real subfield. Let λ, λ+ be the Iwasawa λ-invariants...
AbstractLet k ⊂ k1 ⊂ … ⊂ K be a Zi-extension. The relations of λ(Kk) and λ(KFF) is studied, where Fk...
AbstractLetkbe a real abelian number field with Galois groupΔandpan odd prime number. Denote byk∞the...
In this paper, we will treat a totally real non-cyclic cubic field k with discriminant 1396 = 22・349...
In this paper, we will treat a totally real non-cyclic cubic field k with discriminant 1396 = 22・349...
In this paper, we will treat a totally real non-cyclic cubic field k with discriminant 1396 = 22・349...
AbstractLet k be a finite extension of Q and p a prime number. Let K be a Zp-extension of k and S th...
AbstractBy a reduction of analytic formulas it is shown that the μ invariant of the basic Z3-extensi...
DOI
Add to ORKG