Class Number Relation Between Certain Sextic Number Field

Akira Endo

doi:10.2307/2044512

IWASAWA TYPE FORMULA FOR COVERS OF A LINK IN A RATIONAL HOMOLOGY SPHERE

Journal of Knot Theory and Its Ramifications ◽

10.1142/s0218216508006580 ◽

2008 ◽

Vol 17 (10) ◽

pp. 1199-1221 ◽

Cited By ~ 6

Author(s):

TERUHISA KADOKAMI ◽

YASUSHI MIZUSAWA

Keyword(s):

Number Field ◽

Class Number ◽

Homology Sphere ◽

Rational Homology ◽

Homology Groups ◽

Cyclic Covers ◽

Class Number Formula ◽

Number Formula ◽

Iwasawa Invariants ◽

Rational Homology Sphere

Based on the analogy between links and primes, we present an analogue of the Iwasawa's class number formula in a Zp-extension for the p-homology groups of pn-fold cyclic covers of a link in a rational homology 3-sphere. We also describe the associated Iwasawa invariants precisely for some examples and discuss analogies with the number field case.

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A Density of Ramified Primes

Research in Number Theory ◽

10.1007/s40993-021-00295-5 ◽

2021 ◽

Vol 8 (1) ◽

Author(s):

Stephanie Chan ◽

Christine McMeekin ◽

Djordjo Milovic

Keyword(s):

Number Field ◽

Class Number ◽

Joint Distribution ◽

Number Fields ◽

Character Sums ◽

Prime Ideals ◽

Odd Degree ◽

Narrow Class

AbstractLet K be a cyclic number field of odd degree over $${\mathbb {Q}}$$ Q with odd narrow class number, such that 2 is inert in $$K/{\mathbb {Q}}$$ K / Q . We define a family of number fields $$\{K(p)\}_p$$ { K ( p ) } p , depending on K and indexed by the rational primes p that split completely in $$K/{\mathbb {Q}}$$ K / Q , in which p is always ramified of degree 2. Conditional on a standard conjecture on short character sums, the density of such rational primes p that exhibit one of two possible ramified factorizations in $$K(p)/{\mathbb {Q}}$$ K ( p ) / Q is strictly between 0 and 1 and is given explicitly as a formula in terms of the degree of the extension $$K/{\mathbb {Q}}$$ K / Q . Our results are unconditional in the cubic case. Our proof relies on a detailed study of the joint distribution of spins of prime ideals.

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A Class Number Relation Over Function Fields

Journal of Number Theory ◽

10.1006/jnth.1995.1122 ◽

1995 ◽

Vol 54 (2) ◽

pp. 318-340 ◽

Cited By ~ 4

Author(s):

J.K. Yu

Keyword(s):

Class Number ◽

Function Fields ◽

Number Relation

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On the Relative Class Number of the Imaginary Abelian Number Field II

On the Class Number of Abelian Number Fields ◽

10.1007/978-3-030-01512-1_5 ◽

2019 ◽

pp. 307-357

Author(s):

Helmut Hasse

Keyword(s):

Number Field ◽

Class Number ◽

Relative Class ◽

Relative Class Number ◽

Abelian Number Field

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On some class number relations for Galois extensions

Nagoya Mathematical Journal ◽

10.1017/s0027763000002579 ◽

1987 ◽

Vol 107 ◽

pp. 121-133 ◽

Cited By ~ 6

Author(s):

Takashi Ono

Keyword(s):

Number Field ◽

Algebraic Number ◽

Class Number ◽

Quadratic Forms ◽

Algebraic Number Field ◽

Narrow Sense ◽

Binary Quadratic Forms ◽

Finite Degree ◽

Algebraic Tori ◽

Number Of Classes

Let k be an algebraic number field of finite degree over Q, the field of rationals, and K be an extension of finite degree over k. By the use of the class number of algebraic tori, we can introduce an arithmetical invariant E(K/k) for the extension K/k. When k = Q and K is quadratic over Q, the formula of Gauss on the genera of binary quadratic forms, i.e. the formula where = the class number of K in the narrow sense, the number of classes is a genus of the norm form of K/Q and tK = the number of distinct prime factors of the discriminant of K, may be considered as an equality between E(K/Q) and other arithmetical invariants of K.

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On the class number of an absolutely cyclic number field of prime degree

Proceedings of the Japan Academy ◽

10.3792/pja/1195520612 ◽

1969 ◽

Vol 45 (8) ◽

pp. 647-650 ◽

Cited By ~ 1

Author(s):

Norio Adachi

Keyword(s):

Number Field ◽

Class Number ◽

Prime Degree

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Solutions of the cubic Fermat equation in ring class fields of imaginary quadratic fields (as periodic points of a 3-adic algebraic function)

International Journal of Number Theory ◽

10.1142/s179304211650055x ◽

2016 ◽

Vol 12 (04) ◽

pp. 853-902 ◽

Cited By ~ 2

Author(s):

Patrick Morton

Keyword(s):

Class Number ◽

Algebraic Function ◽

Periodic Points ◽

Imaginary Quadratic Fields ◽

Class Number Formula ◽

All Solutions ◽

Number Formula ◽

Class Fields ◽

Fermat Equation ◽

Number Relation

Explicit solutions of the cubic Fermat equation are constructed in ring class fields [Formula: see text], with conductor [Formula: see text] prime to [Formula: see text], of any imaginary quadratic field [Formula: see text] whose discriminant satisfies [Formula: see text] (mod [Formula: see text]), in terms of the Dedekind [Formula: see text]-function. As [Formula: see text] and [Formula: see text] vary, the set of coordinates of all solutions is shown to be the exact set of periodic points of a single algebraic function and its inverse defined on natural subsets of the maximal unramified, algebraic extension [Formula: see text] of the [Formula: see text]-adic field [Formula: see text]. This is used to give a dynamical proof of a class number relation of Deuring. These solutions are then used to give an unconditional proof of part of Aigner’s conjecture: the cubic Fermat equation has a nontrivial solution in [Formula: see text] if [Formula: see text] (mod [Formula: see text]) and the class number [Formula: see text] is not divisible by [Formula: see text]. If [Formula: see text], congruence conditions for the trace of specific elements of [Formula: see text] are exhibited which imply the existence of a point of infinite order in [Formula: see text].

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A class number relation in Frobenius extensions of number fields

Mathematika ◽

10.1112/s0025579300009128 ◽

1977 ◽

Vol 24 (2) ◽

pp. 216-225 ◽

Cited By ~ 5

Author(s):

Colin D. Walter

Keyword(s):

Class Number ◽

Number Fields ◽

Number Relation

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A combinatorial refinement of the Kronecker-Hurwitz class number relation

Proceedings of the American Mathematical Society ◽

10.1090/proc/13281 ◽

2016 ◽

Vol 145 (3) ◽

pp. 1003-1008 ◽

Cited By ~ 1

Author(s):

Alexandru A. Popa ◽

Don Zagier

Keyword(s):

Class Number ◽

Number Relation

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On the class number of the lpth cyclotomic number field

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100069735 ◽

1991 ◽

Vol 109 (2) ◽

pp. 263-276

Author(s):

Norikata Nakagoshi

Keyword(s):

Number Field ◽

Class Number ◽

Prime Factor ◽

Analytic Formula ◽

Cyclotomic Number ◽

Class Number Formula ◽

Prime Factors ◽

Number Formula ◽

Genus Number ◽

Analytic Class

The first factor of the class number of a cyclotomic number field can be obtainable by the analytic class number formula and there are some tables which show the decompositions of the first factors into primes. But, using just the analytic formula, we cannot tell what kinds of primes will appear as the factors of the class number of a given cyclotomic number field, except for those of the genus number, or the irregular primes. It is significant to find in advance the prime factors, particularly those prime to the degree of the field. For instance, in the table of the first factors we can pick out some pairs (l, p) of two odd primes l and p such that the class number of each lpth cyclotomic number field is divisible by l even if p 1 (mod l). If p ≡ (mod l) for l ≥ 5 or p ≡ 1 (mod 32) for l = 3, then it is easy from the outset to achieve our intention of finding the factor l using the genus number formula. Otherwise it seems to be difficult. We wish to make it clear algebraically why the class number has the prime factor l.

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