In number theory, the Teichmüller character (at a prime ) is a character of , where if is odd and if , taking values in the roots of unity of the p-adic integers. It was introduced by Oswald Teichmüller. Identifying the roots of unity in the -adic integers with the corresponding ones in the complex numbers, can be considered as a usual Dirichlet character of conductor . More generally, given a complete discrete valuation ring whose residue field is perfect of characteristic , there is a unique multiplicative section of the natural surjection . The image of an element under this map is called its Teichmüller representative. The restriction of to is called the Teichmüller character.
Definition
editIf is a -adic integer, then is the unique solution of that is congruent to mod . It can also be defined by
The multiplicative group of -adic units is a product of the finite group of roots of unity and a group isomorphic to the -adic integers. The finite group is cyclic of order or , as is odd or even, respectively, and so it is isomorphic to .[citation needed] The Teichmüller character gives a canonical isomorphism between these two groups.
A detailed exposition of the construction of Teichmüller representatives for the -adic integers, by means of Hensel lifting, is given in the article on Witt vectors, where they provide an important role in providing a ring structure.
See also
editReferences
edit- Section 4.3 of Cohen, Henri (2007), Number theory, Volume I: Tools and Diophantine equations, Graduate Texts in Mathematics, vol. 239, New York: Springer, doi:10.1007/978-0-387-49923-9, ISBN 978-0-387-49922-2, MR 2312337
- Koblitz, Neal (1984), p-adic Numbers, p-adic Analysis, and Zeta-Functions, Graduate Texts in Mathematics, vol. 58, Berlin, New York: Springer-Verlag, ISBN 978-0-387-96017-3, MR 0754003