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The modular group and its subgroups, Fundamental domain for SL(2, Z). Modular
functions and forms, Examples of modular forms and functions such as Eisenstein series,
Poincare series, Ramanujan delta function, j-function, theta functions. Space of modular
forms and cusp forms, Valence formula, Dimension formula, Fourier expansions of
Eisenstein series at infinity and Fourier coefficients of cusp forms, Ramanujan tau-
function and Ramanujan conjectures. Hecke theory (abstract and concrete), Petersson
inner product, L-functions attached to a modular form, analytic continuation and converse
theorem of Hecke, Rankin-Selberg L-function. Theory of modular forms of higher levels,
Atkin-Lehner-Li theory, Applications of modular forms.
If time permits Modular forms of half-integral weights, Hilbert modular forms, Siegel
modular forms and automorphic forms.
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Text/Reference Books:
- J-P. Serre, A course in arithmetic, Springer-Verlag, 1973.
- N. Kolblitz, Introduction to Elliptic curves and Modular forms, Springer-Verlag, 1984.
- M. Ram Murty, M. Dewar and H. Graves, Problems in the theory of modular forms, IMSc Lecture Notes in Mathematics-1, Hindustan Book Agency, 2016.
- F. Diamond and J. Shurman, A first course in Modular forms, GTM 228, Springer- Verlag, 2005.
- T. Miyake, Modular forms, Springer, 2006.
- G. Shimura, Introduction to arithmetic theory of automorphic functions, Princeton University Press, 1971.
- H. Cohen and F. Stromberg, Modular forms: A classical approach, GTM 179, American Mathematical Society, 2017.
- H. Iwaniec, Topics in Classical Automorphic forms, GSM 17, AMS, 1997.
- S. Lang, Introduction to Modular forms, Springer, 1976.
- A. O. L. Atkin and J. Lehner, Hecke operators on \Gamma_0(M), Math. Ann. 185 (1970), 134-160.
- W-C. W. Li, Newforms and functional equations, Math. Ann. 212 (1975), 285–315.
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