Arthur's conjectures refer to a set of ideas proposed by the mathematician James Arthur, particularly in the context of number theory and automorphic forms. Arthur is known for his work on the theory of σ-modular forms and the Langlands program, which seeks to connect number theory, representation theory, and harmonic analysis. One of the main conjectures associated with Arthur is the **Arthur-Selberg trace formula**, which generalizes the Selberg trace formula to more general settings.
Articles by others on the same topic
There are currently no matching articles.