La Classification Mathématique par matières 2000
Mathematics subject Classification 2000Query : CC = 11Fxx
11-XX Number theory
- 11Fxx Discontinuous groups and automorphic forms [See also 11R39, 11S37, 14-XX, 22Exx, 14Gxx, 14Kxx, 22E50, 22E55, 30F35, 32Nxx] [For relations with quadratic forms, see 11E45]
- 11F03 Modular and automorphic functions
- 11F06 Structure of modular groups and generalizations; arithmetic groups [See also 20H05, 20H10, 22E40]
- 11F11 Modular forms, one variable
- 11F12 Automorphic forms, one variable
- 11F20 Dedekind eta function, Dedekind sums
- 11F22 Relationship to Lie algebras and finite simple groups
- 11F23 Relations with algebraic geometry and topology [New MSC 2000 code]
- 11F25 Hecke-Petersson operators, differential operators (one variable)
- 11F27 Theta series; Weil representation
- 11F30 Fourier coefficients of automorphic forms
- 11F32 Modular correspondences, etc.
- 11F33 Congruences for modular and p-adic modular forms [See also 14G20, 22E50]
- 11F37 Forms of half-integer weight; nonholomorphic modular forms
- 11F41 Hilbert and Hilbert-Siegel modular groups and their modular and automorphic forms; Hilbert modular surfaces [See also 14J20]
- 11F46 Siegel modular groups and their modular and automorphic forms
- 11F50 Jacobi forms [New MSC 2000 code]
- MSC 1991 code in relation : 11F55
- 11F52 Modular forms associated to Drinfel'd modules [New MSC 2000 code]
- 11F55 Other groups and their modular and automorphic forms (several variables)
- 11F60 Hecke-Petersson operators, differential operators (several variables)
- 11F66 Dirichlet series and functional equations in connection with modular forms
- 11F67 Special values of automorphic L-series, periods of modular forms, cohomology, modular symbols
- 11F70 Representation-theoretic methods; automorphic representations over local and global fields
- 11F72 Spectral theory; Selberg trace formula
- 11F75 Cohomology of arithmetic groups
- 11F80 Galois representations
- 11F85 p-adic theory, local fields [See also 14G20, 22E50]
- 11F99 None of the above, but in this section
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