On the local Langlands conjecture forGL(2)

1. Buhler, J.: An Icosahedral Form of Weight One. In: Modular functions of one variableV. Lecture Notes in Mathematics 601, pp. 289–294, Berlin-Heidelberg-New York: Springer 1977

   Google Scholar 

2. Callahan, T.: Some Orbital Integrals and a Technique for Counting Representations ofGL ₂(F). To appear

3. Casselman, W.: The Restriction of a Representation ofGL ₂(K) toGL ₂(O). Math. Ann.206, 311–318 (1973)

   Google Scholar 

4. Deligne, P.: Formes modulaires et representations deGL(2). In: Modular functions of one variable II. Lecture Notes in Mathematics 349, pp. 55–106, Berlin-Heidelberg-New York: Springer 1973

   Google Scholar 

5. Deligne, P.: Les constantes des equations fonctionnelles des fonctionsL. In: Modular functions of one variable II. Lecture Notes in Mathematics 349, pp. 501–597, Berlin-Heidelberg-New York: Springer 1973

   Google Scholar 

6. Gelbart, S.: Automorphic forms and Artin's conjecture. To apear in: Proceedings of the 1976 Bonn Conference on Modular Forms VI

7. Howe, R.: Kirillov Theory for CompactP-adic Groups. Preprint. Yale University. 1977

8. Jaquet, H., Langlands, R.P.: Automorphic Forms onGL(2). Lecture Notes in Mathematics 114, Berlin-Heidelberg-New York: Springer 1970

   Google Scholar 

9. Langlands, R.P.: Base change forGL(2): The theory of Saito-Shintani with applications. IAS Notes, Princeton, 1975

10. Serre, J-P.: Corps Locaux, 2nd Edition. Paris: Hermann 1968

    Google Scholar 

11. Serre, J-P.: Modular Forms of Weight One and Galois Representations. In: Algebraic Number Fields (L-Functions and Galois Properties). New York: Academic Press 1977

    Google Scholar 

12. Weil, A.: Basic Number Theory, 3rd Edition. Berlin-Heidelberg-New York: Springer 1974

    Google Scholar 

13. Weil, A.: Exercises Dyadiques. Inventiones Math.27, 1–22 (1974)

    Google Scholar 

Download references