Kummer Theory for Multiquadratic or Quartic Cyclic Number Fields

[1] COHEN, H.: A Course in Computational Algebraic Number Theory.In: Graduate Texts in Mathematics, Vol. 138, Springer-Verlag, Berlin, 1993.10.1007/978-3-662-02945-9 Search in Google Scholar

[2] CONRAD, K.: Galois groups as permutation groups, Lecture Notes, Preprint. Available at: https://kconrad.math.uconn.edu/blurbs/galoistheory/galoisaspermgp.pdf. Search in Google Scholar

[3] DEBRY, C.—PERUCCA, A.: Reductions of algebraic integers,J.Number Theory, 167 (2016), 259–283.10.1016/j.jnt.2016.03.001 Search in Google Scholar

[4] HARDY, K.—HUDSON, R. H.—RICHMAN, D.—WILLIAMS, K. S. — HOLTZ, N. M.: Calculation of the class numbers of imaginary cyclic quartic fields, Math. Comp. 49 (1987), no. 180, 615–620. Search in Google Scholar

[5] HINDRY, M.—SILVERMAN, J. H.: Diophantine Geometry - An Introduction.In: Graduate Texts in Mathematics, Vol. 201, Springer-Verlag, New York, 2000. Search in Google Scholar

[6] HÖRMANN, F.—PERUCCA, A.—SGOBBA, P.—TRONTO, S.: Explicit Kummer generators for cyclotomic extensions, JP J. Algebra, Number Theory Appl. 53 (2022), no. 1, 69–84. Search in Google Scholar

[7] HÖRMANN, F.—PERUCCA, A.—SGOBBA, P.—TRONTO, S.: Explicit Kummer theory for quadratic fields, JP J. Algebra, Number Theory Appl. 50 (2021), no. 2, 151–178. Search in Google Scholar

[8] LANG, S.: Algebra. (Revised Third Edition), In:Graduate Texts in Mathematics, Vol. 211, Springer-Verlag, New York, 2002.10.1007/978-1-4613-0041-0 Search in Google Scholar

[9] MASLEY, J. M.: Class numbers of real cyclic number fields with small conductor,Compositio Math. 37 (1978), no. 3, 297–319. Search in Google Scholar

[10] PERUCCA, A.: The order of the reductions of an algebraic integer, J. Number Theory, 148 (2015), 121–136.10.1016/j.jnt.2014.09.022 Search in Google Scholar

[11] PERUCCA, A.—SGOBBA, P.: Kummer theory for number fields and the reductions of algebraic numbers, Int.J.NumberTheory, 15 (2019), no. 8, 1617–1633. Search in Google Scholar

[12] PERUCCA, A.—SGOBBA, P.—TRONTO, S.: Explicit Kummer theory for the rational numbers, Int.J.Number Theory, 16 (2020), no. 10, 2213–2231. Search in Google Scholar

[13] PERUCCA, A.—SGOBBA, P.—TRONTO, S.: The degree of Kummer extensions of number fields,Int.J. NumberTheory, 17 (2021), no. 5, 1091–1110. Search in Google Scholar

[14] THE SAGE DEVELOPERS: SageMath, the Sage Mathematics Software System (Version 9.2), https://www.sagemath.org, 2021. Search in Google Scholar

[15] SCHINZEL, A.: Abelian binomials, power residues and exponential congruences, Acta Arith. 32 (1977), no. 3, 245–274. Addendum, ibid. 36 (1980), 101–104. See also: Andrzej Schinzel Selecta Vol.II, European Mathematical Society, Zürich, 2007, 939–970. Search in Google Scholar