Category:Zeta and L-functions
From Wikipedia, the free encyclopedia
Zeta-functions and L-functions express important relations between the geometry of Riemann surfaces, number theory and dynamical systems. Zeta-functions, and their generalizations such as the Selberg class S, are conjectured to have various important properties, including generalizations of the Riemann hypothesis and various relationships with automorphic forms as well as to the representations of groups. The pursuit of the relationships comprises the Langlands program.
This category corresponds roughly to MSC 11M Zeta and L-functions: analytic theory in the American Mathematical Society's Mathematics Subject Classification.
Pages in category "Zeta and L-functions"
There are 53 pages in this section of this category.
