Zahlbericht
1897 report
title: "Zahlbericht" type: doc version: 1 created: 2026-02-28 author: "Wikipedia contributors" status: active scope: public tags: ["1897-in-science", "1897-non-fiction-books", "algebraic-number-theory", "history-of-mathematics", "mathematics-books", "treatises"] description: "1897 report" topic_path: "history" source: "https://en.wikipedia.org/wiki/Zahlbericht" license: "CC BY-SA 4.0" wikipedia_page_id: 0 wikipedia_revision_id: 0
::summary 1897 report ::
::data[format=table title="Infobox book"]
| Field | Value |
|---|---|
| author | David Hilbert |
| pub_date | 1897 |
| genre | Mathematics |
| subject | Algebraic number theory |
| :: |
In mathematics, the Zahlbericht (number report) was a report on algebraic number theory by .
| author = David Hilbert | pub_date = 1897 | genre = Mathematics | subject = Algebraic number theory
History
In 1893 the German Mathematical Society invited Hilbert and Minkowski to write reports on the theory of numbers. They agreed that Minkowski would cover the more elementary parts of number theory while Hilbert would cover algebraic number theory. Minkowski eventually abandoned his report, while Hilbert's report was published in 1897. It was reprinted in volume 1 of his collected works, and republished in an English translation in 1998. and and the English introduction to give detailed discussions of the history and influence of Hilbert's Zahlbericht.
Some earlier reports on number theory include the report by H. J. S. Smith in 6 parts between 1859 and 1865, reprinted in , and the report by . wrote an update of Hilbert's Zahlbericht that covered class field theory (republished in 1 volume as ).
Contents
Part 1 covers the theory of general number fields, including ideals, discriminants, differents, units, and ideal classes.
Part 2 covers Galois number fields, including in particular Hilbert's theorem 90.
Part 3 covers quadratic number fields, including the theory of genera, and class numbers of quadratic fields.
Part 4 covers cyclotomic fields, including the Kronecker–Weber theorem (theorem 131), the Hilbert–Speiser theorem (theorem 132), and the Eisenstein reciprocity law for lth power residues (theorem 140) .
Part 5 covers Kummer number fields, and ends with Kummer's proof of Fermat's last theorem for regular primes.
References
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