On the reciprocity law in algebraic number fields
Hilbert's ninth problem , from the list of 23 Hilbert's problems (1900), asked to find the most general reciprocity law for the norm residues of k -th order in a general algebraic number field , where k is a power of a prime .
Progress made
The problem was partially solved by Emil Artin by establishing the Artin reciprocity law which deals with abelian extensions of algebraic number fields .[ 1] [ 2] [ 3] Together with the work of Teiji Takagi and Helmut Hasse (who established the more general Hasse reciprocity law), this led to the development of the class field theory , realizing Hilbert's program in an abstract fashion. Certain explicit formulas for norm residues were later found by Igor Shafarevich (1948; 1949; 1950).
The non-abelian generalization , also connected with Hilbert's twelfth problem , is one of the long-standing challenges in number theory and is far from being complete.
See also
References
^ Artin, Emil (1924). "Über eine neue Art von L-Reihen". Abhandlungen aus dem Mathematischen Seminar der Universität Hamburg . 3 : 89–108.
^ Artin, Emil (1927). "Beweis des allgemeinen Reziprozitätsgesetzes". Abhandlungen aus dem Mathematischen Seminar der Universität Hamburg . 5 : 353–363.
^ Artin, Emil (1930). "Idealklassen in Oberkörpern und allgemeines Reziprozitätsgesetzes". Abhandlungen aus dem Mathematischen Seminar der Universität Hamburg . 7 : 46–51.
External links