genus theory for function fields

Sunghan Bae; Ja Kyung Koo

doi:10.1017/S1446788700037824

Abstract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

We study the genus theory for function fields which is the analogue of the classical genus theory developed by Hasse and Fröhlich.

References

[1]Clement, R., ‘The genus field of an algebraic function field’, J. Number Theory 40 (1992), 359–375.Google Scholar

[2]Fröhlich, A., Central extensions, Galois groups, and ideal class groups of number fields, Contemp. Math. 24 (Amer. Math. Soc., Providence, 1983).CrossRef Google Scholar

[3]Hasse, H., ‘Zur Geschlecht Theorie in quadratischen Zahlkörpern’, J. Math. Soc. Japan 3 (1951), 45–51.CrossRef Google Scholar

[4]Hayes, D., ‘Explicit class field theory for rational function fields’, Trans. Amer. Math. Soc. 189 (1974), 77–91.Google Scholar

[5]Hayes, D., ‘Stickelberger elements in function fields’, Compositio Math. 55 (1985), 209–239.Google Scholar

[6]Rosen, M., ‘The Hilbert class field in function fields’, Exposition. Math. 5 (1987), 365–378.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Jung, Hwanyup and Ahn, Jaehyun 2007. Divisor class number one problem for abelian extensions over rational function fields. Journal of Algebra, Vol. 310, Issue. 1, p. 1.

Jung, Hwan-Yup 2008. IMAGINARY BICYCLIC FUNCTION FIELDS WITH THE REAL CYCLIC SUBFIELD OF CLASS NUMBER ONE. Bulletin of the Korean Mathematical Society, Vol. 45, Issue. 2, p. 375.

Hu, Su and Li, Yan 2010. The genus fields of Artin–Schreier extensions. Finite Fields and Their Applications, Vol. 16, Issue. 4, p. 255.

Li, Yan and Hu, Su 2011. Capitulation problem for global function fields. Archiv der Mathematik, Vol. 97, Issue. 5, p. 413.

Bae, Sung-Han and Jung, Hwan-Yup 2012. ℓ-RANKS OF CLASS GROUPS OF FUNCTION FIELDS. Journal of the Korean Mathematical Society, Vol. 49, Issue. 1, p. 49.

Bae, Sunghan Hu, Su and Jung, Hwanyup 2012. The generalized Rédei-matrix for function fields. Finite Fields and Their Applications, Vol. 18, Issue. 4, p. 760.

Maldonado-Ramírez, Myriam Rzedowski-Calderón, Martha and Villa-Salvador, Gabriel 2013. Genus fields of abelian extensions of rational congruence function fields. Finite Fields and Their Applications, Vol. 20, Issue. , p. 40.

BAUTISTA-ANCONA, VÍCTOR RZEDOWSKI-CALDERÓN, MARTHA and VILLA-SALVADOR, GABRIEL 2013. GENUS FIELDS OF CYCLIC l-EXTENSIONS OF RATIONAL FUNCTION FIELDS. International Journal of Number Theory, Vol. 09, Issue. 05, p. 1249.

Zhao, Zhengjun and Hu, Wanbao 2016. On l-class groups of global function fields. International Journal of Number Theory, Vol. 12, Issue. 02, p. 341.

Maldonado-Ramírez, Myriam Rzedowski-Calderón, Martha and Villa-Salvador, Gabriel 2017. Genus fields of congruence function fields. Finite Fields and Their Applications, Vol. 44, Issue. , p. 56.

Barreto-Castaneda, Jonny Fernando Montelongo-Vazquez, Carlos Reyes-Morales, Carlos Daniel Rzedowski-Calderon, Martha and Villa-Salvador, Gabriel 2018. Genus fields of abelian extensions of rational congruence function fields, II. Rocky Mountain Journal of Mathematics, Vol. 48, Issue. 7,

Reyes-Morales, Carlos Daniel and Villa-Salvador, Gabriel 2021. Genus fields of Kummer ℓn-cyclic extensions. International Journal of Mathematics, Vol. 32, Issue. 09, p. 2150062.

Rzedowski‐Calderón, Martha and Villa‐Salvador, Gabriel 2023. Class fields, Dirichlet characters, and extended genus fields of global function fields. Mathematische Nachrichten, Vol. 296, Issue. 8, p. 3606.

Hernandez B., Juan C. and Villa S., Gabriel D. 2023. Genus Field and Extended Genus Field of an Elementary Abelian Extension of Global Fields. Bulletin of the Brazilian Mathematical Society, New Series, Vol. 54, Issue. 2,

Yoo, Jinjoo and Lee, Yoonjin 2024. Infinite families of Artin–Schreier function fields with any prescribed class group rank. Canadian Journal of Mathematics, Vol. 76, Issue. 5, p. 1773.

Article contents

genus theory for function fields

Abstract

MSC classification

References

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

genus theory for function fields

Abstract

MSC classification

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests